Find a number written in binary system that when read as a number in decimal system is five times


smaller than the same number read as a decimal (notice that any binary number can be also


interpret as a decimal, for example 111 can represent a binary number but also can be seen as one


hundred and eleven - a decimal).


Treat this question like a puzzle, just try different numbers and this way guess the answer.

The Fahrenheit temperature of the cup of water after 5 minutes is approximately 194°F.

According to Newton's Law of Cooling, the temperature of an object decreases proportionally to the difference between its temperature and the surrounding temperature. The formula is given as:

T = T_a + (T_0 - T_a) * e^(-kt)

In this case, T_a represents the temperature of the room (67°F), T_0 represents the initial temperature of the water (201°F), t represents time in minutes, T represents the temperature of the water at a given time, and k is the decay constant we need to find.

We know that after 3 minutes, the temperature of the water reaches 190°F. Plugging in these values into the equation:

190 = 67 + (201 - 67) * e^(-3k)

Simplifying the equation:

123 = 134 * e^(-3k)

Dividing both sides by 134:

e^(-3k) = 123/134

Taking the natural logarithm of both sides:

-3k = ln(123/134)

Dividing both sides by -3:

k ≈ ln(123/134) / -3 ≈ -0.0104

Now that we have the value of k, we can use the equation to determine the temperature of the water after 5 minutes:

T = 67 + (201 - 67) * e^(-0.0104 * 5)

Calculating the expression:

T ≈ 67 + 134 * e^(-0.052)

T ≈ 67 + 134 * 0.9492

T ≈ 67 + 127.2268

T ≈ 194.23°F

Therefore, the Fahrenheit temperature of the cup of water after 5 minutes is approximately 194°F.

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The mixed-number that is equal to 4 7/5 is 4 7/5 itself. The correct option is B) 4 7/5, using conversion into improper-fraction & vice-versa.

To convert the mixed number 4 7/5 into an improper fraction,

we will multiply the denominator by the whole number and add the numerator. 4 × 5 + 7 = 27.

Thus, 4 7/5 as an improper fraction is 27/5.

Now, we have to convert the given mixed numbers into improper fractions one by one, and then

compare it to 27/5 , is the fraction equivalent to 4 7/5.

Let's do it:

Option A:9 2/5 = 47/5

Divide 47 by 5 and we get 9 with a remainder of 2.

Thus, 9 2/5 = 47/5 which is not equal to 27/5.

Option B:4 7/5 = 27/5

As we know 4 7/5 as an improper fraction is 27/5, and it matches our answer with the given mixed number.

Option C:5 2/9 = 47/9

Divide 47 by 9 and we get 5 with a remainder of 2.

Thus, 5 2/9 = 47/9 which is not equal to 27/5.

Option D:4/5 = 0.8

Clearly, 0.8 is not equal to 27/5.

So, the mixed number that is equal to 4 7/5 is 4 7/5 itself. The correct option is B) 4 7/5.

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Yes, the equation y - 250x = 500 represents the same relationship between the distance from the start of the trail and the elevation.

The given equation is y - 250x = 500.
The above equation is of the form y = mx + c, where m = slope of the line and c = y-intercept of the line.
Let us convert the given equation into the form y = mx + c, y - 250x = 500, y = 250x + 500. Now, we can see that this equation is of the form y = mx + c, where m = 250, which means that the slope of the line is 250 and the value of y-intercept is 500.

Thus, the equation y - 250x = 500 represents the relationship between the distance from the start of the trail and the elevation.

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If the value of a polynomial is 0 when x=5, then (x-5) must be a factor of the polynomial.

A polynomial is a mathematical expression consisting of variables (or indeterminates) and coefficients, combined using addition, subtraction, and multiplication operations.

Polynomials are widely used in mathematics and various fields such as physics, engineering, computer science, and economics. They play a crucial role in solving equations, interpolation, approximation, and modeling various phenomena. Polynomial equations are also studied extensively in algebra, and techniques like factoring, long division, synthetic division, and the quadratic formula are used to analyze and solve them.

Given that the value of a polynomial is 0 when x=5.

To find the expression which must be a factor of the polynomial we can use the factor theorem which states that:

If x-a is a factor of polynomial f(x), then f(a) = 0.So, if the value of a polynomial is 0 when x=5, then (x-5) must be a factor of the polynomial.

Hence, the required expression which must be a factor of the polynomial is (x - 5).

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No, Garrett's slope is not correct. He should have put the x values in the denominator and the y values in the numerator.

Garrett made an error in calculating the slope. The slope represents the change in the dependent variable (y) per unit change in the independent variable (x). In this case, the independent variable is "Years" (x) and the dependent variable is "Hourly rate" (y).

To calculate the slope correctly, we need to divide the change in y by the change in x. Garrett incorrectly subtracted the x values from each other and the y values from each other, resulting in an incorrect calculation.

The correct calculation would be:

Slope = (13.00 - 12.00) / (8 - 4)

= 1.00 / 4

= 0.25

Therefore, the correct slope is 0.25 or StartFraction 1 Over 4 EndFraction.

Garrett's error was that he should have put the x values (4, 8, 12) in the denominator and the y values (12.00, 13.00, 14.00) in the numerator to calculate the slope correctly.

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The discounted-price of the game system is $154.00, given the original-cost of a video game system is $175 and Raymond works in an electronics store and gets a 12 percent employee discount.

The discounted price, we need to find 12% of $175 which is equal to: [tex]\frac{12}{100}\times175=21[/tex]

The employee discount is $21.

We need to subtract this discount from the original cost:

175 - $21 = 154

So, the discounted price of the game system is $154.00.

Therefore, the correct option is $154.00

The discounted price of the game system is indeed $154.00.

The original cost of the game system is $175, and

Raymond receives a 12% employee discount.

We calculate 12% of $175, which is $21.

By subtracting this discount from the original cost, we get $154.00, which is the final discounted price.

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Marcus ends up paying $37.70 for the two shirts. To calculate the final price Marcus pays for the shirts, we need to follow these steps:

Calculate the discounted price of each shirt: Since the shirts are on a 30% off rack, the discounted price of the first shirt is 0.70 * $28.99 = $20.29, and the discounted price of the second shirt is 0.70 * $30.29 = $21.20.

Calculate the total cost of the shirts before tax: The total cost of the two shirts is $20.29 + $21.20 = $41.49.Apply the additional 10% off discount: To calculate the final price after the additional discount, we need to subtract 10% from the total cost. 10% of $41.49 is 0.10 * $41.49 = $4.15. Subtracting this amount from the total cost gives us $41.49 - $4.15 = $37.34.

Add the sales tax: To calculate the final price including the 6% sales tax, we need to add 6% of $37.34 to the total cost. 6% of $37.34 is 0.06 * $37.34 = $2.24. Adding this amount to the total cost gives us $37.34 + $2.24 = $39.58.

Rounding to the nearest cent, Marcus ends up paying $39.59 for the two shirts. Therefore, the correct answer is option a. $39.59.

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The total number of pennies on Rows 1-4 (the first 32 squares) is 232. The content loaded formula can be used to calculate the total number of pennies on the Rows 1-4 of the first 32 squares.

formula = 2^(n-1) + 2^(n-2) + 2^(n-3) + 2^(n-4) + 2^(n-5) + ……+ 2^1 + 2^0Where n = the number of rows The first four rows of the chessboard have 2^(4-1) = 8, 2^(4-2) = 4, 2^(4-3) = 2, and 2^(4-4) = 1 pennies respectively .The total number of pennies on the first 32 squares (Rows 1-4) is calculated using the following formula; Total = 8 + 4 + 2 + 1 = 15For the first four rows (the first 32 squares), the total number of pennies is 15. Hence, the correct option is 15.

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A right triangle is a type of triangle that has a 90° angle. Three squares in a group can be arranged to form a right triangle, but only if they meet certain criteria.

So, let's take a look at the options provided in the question.

Option A: a 3x3 square, a 2x2 square, and a 1x1 squareIf we join these squares at their vertical vertices, we will get an L shape, which doesn't form a right triangle.

So, option A is not correct.

Option B: a 4x4 square, a 3x3 square, and a 1x1 squareIf we join these squares at their vertical vertices, we will get a right triangle with the 4x4 square being the hypotenuse. Therefore, option B is the correct answer.

Option C: a 3x3 square, a 2x2 square, and a 2x2 squareIf we join these squares at their vertical vertices, we will get a shape with two sides that are equal in length and one side that is shorter. This does not form a right triangle. Therefore, option C is not correct.

To sum up, the group of three squares that will form a right triangle when joined at their vertical vertices is a 4x4 square, a 3x3 square, and a 1x1 square, which is option B.

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Let's assume the original length of the rectangle is 'l' cm and the original width is 'w' cm. The area of the original rectangle is given as 48 cm^2. It seems there might be an error or inconsistency in the problem statement or calculation.

1. When both the length and width are increased by 4 cm, the area of the larger rectangle is increased by 12 cm^2. To find the length and width of the original rectangle, we can set up an equation and solve for the unknowns.

2. Let's start by considering the original rectangle with length 'l' cm and width 'w' cm. The area of a rectangle is calculated by multiplying its length and width, so the area of the original rectangle is given by A = l * w.

3. According to the problem, the area of the original rectangle is 48 cm^2. Therefore, we have the equation:

l * w = 48   ----(1)

4. Now, let's consider the larger rectangle, where both the length and width are increased by 4 cm. The new length would be 'l + 4' cm, and the new width would be 'w + 4' cm. The area of the larger rectangle is given by A' = (l + 4)(w + 4).

5. The problem states that the area of the larger rectangle is increased by 12 cm^2 compared to the original rectangle. Therefore, we can set up another equation:

(l + 4)(w + 4) = 48 + 12   ----(2)

6. We now have a system of two equations (equations 1 and 2) with two unknowns (l and w). To solve this system, we can substitute equation 1 into equation 2 and simplify:

(l + 4)(w + 4) = 48 + 12

lw + 4l + 4w + 16 = 60

lw + 4l + 4w = 44

7. Using equation 1, we can substitute lw with 48:

48 + 4l + 4w = 44

4l + 4w = 44 - 48

4l + 4w = -4

Dividing both sides by 4, we get:

l + w = -1

8. Since we are dealing with dimensions, the length and width cannot be negative. Therefore, it seems there might be an error or inconsistency in the problem statement or calculation. Please verify the given information to find a solution.

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Mr Dlamini will earn R960 for a full bus from Butterworth to East  London. The distance between Butterworth and East London is 100 kilometres.

Mr Dlamini transports people between Butterworth and East London using a bus with a capacity of 100 people. The transport charge starts with a minimum charge of R8 and thereafter it is increased by R2 for each kilometre.

On a particular day, the bus was full with passengers from Butterworth. In each and every kilometre, there was a passenger getting off while no new passenger entered the bus.

The distance between Butterworth and East London is 100 kilometres. Therefore, the total transport charge for the journey is 100 x (R8 + R2/km) = R960.

It is important to note that this is just the transport charge. Mr Dlamini may also incur other costs, such as fuel, maintenance, and insurance. Therefore, his actual profit may be less than R960.

Here is a table showing the transport charge for each kilometre:

Kilometers | Transport charge

------- | --------

0 | R8

1 | R10

2 | R12

... | ...

100 | R960

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The rational numbers 3.70 and 3.75 lie between 14, forming a range or interval in which 14 is situated.

To determine the rational numbers between 14, we need to find two numbers that are greater than 14 and two numbers that are less than 14. From the given options, 3.70 and 3.75 are the two rational numbers that lie between 14. They are both less than 14 but greater than the other options provided. These numbers form a range or interval in which 14 is situated.

The rational number 3.70 is less than 14, but it is closer to 14 compared to the other options provided. Similarly, 3.75 is also less than 14 but closer to it compared to the other options. Thus, both 3.70 and 3.75 form a range that includes 14 as a rational number between them.

In conclusion, the rational numbers 3.70 and 3.75 lie between 14, forming a range or interval in which 14 is situated.

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The approximate probability that a student chooses a computer elective and an art elective is 1 or 100%.

To determine the approximate probability that a student chooses a computer elective and an art elective, we need to consider the total number of electives available and the specific choices a student can make.

To calculate the probability, we can follow these steps:

Determine the total number of possible elective combinations: Since each student can choose two electives, we multiply the number of options for each elective category. In this case, it would be 3 art electives * 5 computer electives = 15 possible combinations.

Determine the number of favorable outcomes: We want to find the number of combinations where a student chooses one art elective and one computer elective. Since there are 3 art electives and 5 computer electives, the number of favorable outcomes is 3 art electives * 5 computer electives = 15 combinations.

Calculate the probability: To find the approximate probability, we divide the number of favorable outcomes by the total number of possible combinations. Therefore, the probability is 15/15 = 1. Therefore, the approximate probability that a student chooses a computer elective and an art elective is 1 or 100%.

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James has 117 merit points, Sarah has 351 merit points, and Robert has 56 merit points.

Let's break down the given information and solve the problem step by step.

Let's assume James has x merit points.

According to the given information, Sarah has three times as many merit points as James. Therefore, Sarah has 3x merit points.

Robert has 61 fewer merit points than James. So, Robert has (x - 61) merit points.

Now, we can calculate the total value of the merit points in pence. Since each merit point is worth 3 pence, we can express the total value in pence as:

Value in pence = (x * 3) + (3x * 3) + ((x - 61) * 3)

Next, we need to convert the total value from pence to pounds. Since there are 100 pence in 1 pound, we divide the total value in pence by 100 to get the value in pounds:

Value in pounds = Value in pence / 100

According to the problem, the total value is £15.72. So we can set up the equation:

Value in pounds = 15.72

Now we can substitute the expression for the value in pounds into the equation:

((x * 3) + (3x * 3) + ((x - 61) * 3)) / 100 = 15.72

Simplifying the equation:

(3x + 9x + 3x - 183) / 100 = 15.72

Combining like terms:

15x - 183 / 100 = 15.72

Multiplying both sides of the equation by 100 to eliminate the fraction:

15x - 183 = 1572

Adding 183 to both sides:

15x = 1755

Dividing both sides by 15:

x = 117

Now we have the value of x, which represents the number of merit points James has. Plugging this value into the expressions we obtained earlier, we can find the number of merit points for each student:

James: x = 117 merit points

Sarah: 3x = 3 * 117 = 351 merit points

Robert: (x - 61) = 117 - 61 = 56 merit points

Therefore, James has 117 merit points, Sarah has 351 merit points, and Robert has 56 merit points.

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The expression 14 × 23 represents the total number of cups of dirt needed for 14 pots of flowers. By multiplying the number of pots (14) by the amount of dirt needed per pot (23), we find that a total of 322 cups of dirt are required to fill all 14 pots.

To calculate the total number of cups of dirt needed for 14 pots of flowers, we can use the expression 14 × 23.

Let's break down the problem and explain the steps involved.

Given information:

Each pot of flowers requires 23 cups of dirt.

We want to find the total number of cups of dirt needed for 14 pots.

To solve this, we can multiply the number of pots (14) by the number of cups of dirt required for each pot (23).

Expression: 14 × 23

When we multiply 14 by 23, we perform the following calculation:

14 × 3 = 42 (multiplying the units digit)

14 × 20 = 280 (multiplying the tens digit)

Summing the results: 280 + 42 = 322

Therefore, the total number of cups of dirt needed for 14 pots is 322 cups.

Let's analyze this further.

When we say that 1 pot of flowers requires 23 cups of dirt, it means that each individual pot needs a specific amount of dirt to be properly filled. Multiplying this amount by the number of pots (14) gives us the cumulative requirement for all the pots.

Using the expression 14 × 23, we are essentially multiplying the number of pots (14) by the amount of dirt needed per pot (23). This expression allows us to find the total quantity of dirt required to fill all 14 pots.

The multiplication process involves multiplying the units digit (4) of 14 by 3, which gives us 12. The result has a carry-over of 1, which we then multiply by the tens digit (2) of 14, resulting in 20. Finally, we add these two products (12 and 20) to obtain the final result of 322.

In conclusion, the expression 14 × 23 represents the total number of cups of dirt needed for 14 pots of flowers. By multiplying the number of pots (14) by the amount of dirt needed per pot (23), we find that a total of 322 cups of dirt are required to fill all 14 pots.

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Araceli had 20 minutes for a 3-problem quiz. She spent 11 7/10 minutes on question A and 3 2/5 minutes on question B, leaving her 5 1/5 minutes for question C. Effective time management is important during tests.

Araceli had 20 minutes to complete a three-problem quiz, and she spent 11 7/10 minutes on question A and 3 2/5 minutes on question B. To find out how much time she spent on question C, we can subtract the time she spent on question A and question B from the total time of 20 minutes:

20 minutes - 11 7/10 minutes - 3 2/5 minutes = 5 1/5 minutes

Therefore, Araceli spent 5 1/5 minutes on question C.

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The total area of the roof that will need shingles is 660 square feet.

Construction projects often use the Pythagorean Theorem.

If you are building a sloped roof and you know the height of the roof and the length for it to cover, you can use the Pythagorean Theorem to find the diagonal length of the roof's slope.

In order to find the diagonal length of the roof's slope, we must use the

Pythagorean Theorem which is: a² + b² = c²,

where a and b are the sides of a right triangle, and c is the hypotenuse.

Given that the roof has a vertical height of 8 feet and the house has a width of 20 feet, we need to calculate the diagonal length of the roof top.

We can use the Pythagorean Theorem to find the length of the roof's diagonal, which is represented by the hypotenuse of the right triangle.
Therefore,
a = 8 feet and b = 20 feet
c² = a² + b²
c² = 8² + 20²
c² = 64 + 400
c² = 464
c ≈ 21.54
The diagonal length of the roof top is ≈ 22 feet.
The horizontal length of the roof is 30 feet.

The total area of the roof that will need shingles can be calculated by multiplying the horizontal length of the roof by the diagonal length of the roof.
Therefore,
Total area of the roof that will need shingles = Horizontal length × Diagonal length
Total area of the roof that will need shingles = 30 feet × 22 feet
Total area of the roof that will need shingles = 660 square feet

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To provide a comprehensive explanation about the circumstances of the region watered by sprinklers, let's discuss some relevant factors that can influence the extent and coverage of water distribution.

Sprinkler Type and Design: Different types of sprinklers have varying spray patterns and distribution capabilities. Factors such as nozzle size, rotation speed, and spray angle can affect the distance and coverage area of water dispersion. Sprinklers can be designed for specific applications, including fixed, rotating, or oscillating patterns. Water Pressure: The water pressure supplied to the sprinkler system plays a crucial role in determining the coverage area. Higher water pressure can result in increased spray distance and wider coverage, while lower pressure may restrict the reach of the sprinklers. Sprinkler Spacing and Layout: The arrangement of sprinklers within the irrigated area affects the overall coverage. Proper spacing ensures adequate overlap between adjacent sprinklers, minimizing dry spots and achieving uniform water distribution. Wind Conditions: Wind speed and direction can impact the efficiency of sprinkler systems. Strong winds can cause water drift and uneven distribution, leading to areas with insufficient water coverage.

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The painting has increased in value by 33% over a three-year period. To determine the current value of the painting, an expression can be utilized. The following expression represents the current value of the painting: V + 0.33V = (1 + 0.33)V = 1.33VWhere V represents the initial value of the painting.

An expression can be utilized to represent the current value of a painting that has increased in value by 33% over a three-year period. The initial value of the painting is represented by the letter V, which is included in the expression. The 33% increase is represented by 0.33 V. To determine the current value of the painting, the expression must be evaluated. The expression V + 0.33V can be simplified by combining the two terms. This results in (1 + 0.33) V. The value of 1 represents the initial value of the painting, and 0.33 represents the 33% increase in value. To determine the current value of the painting, this expression can be multiplied. Multiplying 1.33 by the initial value of the painting, which is represented by V, yields the following expression: 1.33VThis expression represents the current value of the painting, which has increased in value by 33% over a three-year period. The value of the painting is now 1.33 times its initial value. Therefore, the painting has increased in value by 33%.

The current value of the painting can be determined by using an expression. This expression includes the initial value of the painting and the 33% increase in value that has occurred over a three-year period. The expression can be simplified and multiplied to determine the current value of the painting, which is represented by 1.33 V.

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After dilating Triangle ABC with a scale factor of 1/4, the new coordinates of A', B', and C' are A'(2,1), B'(3,1), and C'(4,3), respectively.

To dilate Triangle ABC with a scale factor of 1/4, we need to multiply the coordinates of each vertex by the scale factor.

Let's apply the scale factor to each coordinate:

A' = (8 * 1/4, 4 * 1/4)

  = (2, 1)

B' = (12 * 1/4, 4 * 1/4)

  = (3, 1)

C' = (16 * 1/4, 12 * 1/4)

  = (4, 3)

Therefore, after dilating Triangle ABC with a scale factor of 1/4, the new coordinates of A', B', and C' are (2,1), (3,1), and (4,3) respectively. The scale factor of 1/4 shrinks the original triangle by a factor of 1/4 in both the x and y directions, resulting in a smaller triangle with the new coordinates.

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This simplifies to: 42x + 51y = 297. We now have a new equation in terms of y. To solve for y, we need another equation. If you have another equation, please provide it, and we can continue solving the system of equations.

To solve the system of equations represented by 14x + 17y = 99, we can use either substitution or elimination methods. In this case, let's use the elimination method.

To use the elimination method, we need to manipulate the equations to eliminate one variable. In this case, we can eliminate the variable x by multiplying the first equation by 17 and the second equation by 14, resulting in:

(17)(14x + 17y) = (17)(99)

(14)(14x + 17y) = (14)(99)

Simplifying these equations gives us:

238x + 289y = 1683

196x + 238y = 1386

Now, we can subtract the second equation from the first equation to eliminate x:

(238x + 289y) - (196x + 238y) = 1683 - 1386

This simplifies to: 42x + 51y = 297

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L ≈ 35.8 ,the length of the arc to the nearest tenth is 35.8 units

The formula for calculating the length of an arc intercepted by a central angle is L=, where L is the arc's length,  is the circle's radius, and  is the central angle in radians. The length of the arc to the nearest tenth is 35.8 units. Given, In a circle with radius r = 6.5, an angle measuring  = 5.5 radians intercepts an arc. We know that the formula for calculating the length of an arc intercepted by a central angle is L=, where L is the arc's length,  is the circle's radius, and  is the central angle in radians. Substituting the values in the formula, we get:

L = rL = 6.5(5.5)L = 35.75 ≈ 35.8 (to the nearest 10th)

Therefore, the length of the arc to the nearest tenth is 35.8 units.

In a circle, the length of an arc intercepted by a central angle is determined by the central angle's size and the circle's radius. This is known as the arc's length formula. L=where L is the arc length,  is the radius of the circle, and  is the central angle in radians. We can use this formula to find the length of an arc intercepted by a central angle in a circle. Let's consider the following illustration to understand the concept better. In a circle with a radius of 6.5, an angle of 5.5 radians intercepts an arc. We'll use the arc length formula to find the arc's length, L.L= (Length of arc formula)Substitute the given value of r and  in the formula. L = 6.5 × 5.5L = 35.75The length of the arc is 35.75 units. We'll round this answer to the nearest tenth to get the final answer. L ≈ 35.8Therefore, the length of the arc to the nearest tenth is 35.8 units.

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Therefore, the weight of B is 31 kg.

Let's solve the problem step by step.

1.Let's assign variables to the weights of the three individuals:

Weight of A = a

Weight of B = b

Weight of C = c

2.We are given that the average weight of A, B, and C is 45 kg:

(a + b + c) / 3 = 45

3.We are also given that the average of A and B is 40 kg:

(a + b) / 2 = 40

4.Additionally, we are given that the average of B and C is 43 kg:

(b + c) / 2 = 43

5.From equation 3, we can solve for a + b:

a + b = 2 * 40

a + b = 80

6.Substituting this value into equation 1:

(80 + c) / 3 = 45

7.Solving equation 6 for c:

80 + c = 3 * 45

80 + c = 135

c = 135 - 80

c = 55

8.Substituting the value of c into equation 4:

(b + 55) / 2 = 43

9.Solving equation 8 for b:

b + 55 = 2 * 43

b + 55 = 86

b = 86 - 55

b = 31

Therefore, the weight of B is 31 kg.

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No, the function f(x) = πsin(3x) - 4xsin(2x) is not a sinusoid. A sinusoid is a function that can be represented by a sine or cosine function with certain characteristics.

In the given function f(x) = πsin(3x) - 4xsin(2x), we can see that there are two sine terms with different frequencies, 3x and 2x. This indicates that the function does not have a constant frequency, which is a requirement for a sinusoid. Additionally, the presence of the term -4x introduces a linear term, which further deviates from the sinusoidal form.

Therefore, due to the varying frequencies and the inclusion of a linear term, the function f(x) = πsin(3x) - 4xsin(2x) does not meet the criteria to be classified as a sinusoid.

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The true statements that could be part of the explanation of the statement "tan 40° ≈ 0.84" are: All right triangles with an acute angle of 40° are similar to each other. If you know tan 40° ≈ 0.84 and the length of the leg opposite to the 40° angle, then you can calculate the length of the other leg. The ratio of the opposite side to the hypotenuse in any right triangle with an angle of 40° is always approximately 0.84

In a right triangle, the tangent of an acute angle is defined as the ratio of the opposite side and the adjacent side of that angle. Mathematically, for an acute angle A, tan(A) = opposite/adjacent. In the current case, we are discussing tan 40°. So, if the angle A in a right triangle is 40°, and if the opposite side to that angle is x and the adjacent side is y, then tan 40° = x/y .If we know the value of tan 40°, then we can calculate the value of x/y or y/x .In the following true statements, we will discuss how we can use tan 40° to make some conclusions: The ratio of the opposite side to the hypotenuse in any right triangle with an angle of 40° is always approximately 0.84This statement is true. This is based on the definition of tangent. tan 40° = opposite/adjacent. In a right triangle with an angle of 40°, the hypotenuse is neither the opposite side nor the adjacent side. But, we can write the above equation as opposite/hypotenuse = tan 40°/1. So, the ratio of the opposite side to the hypotenuse in any right triangle with an angle of 40° is always approximately 0.84.

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Noah fills a soap dispenser from a big bottle that contains [tex]2\frac{1}{3}[/tex] liters of liquid soap. One dispenser can hold approximately 0.6667 liters of soap.

To determine how many liters of soap fit into one dispenser, we can divide the total amount of soap in the big bottle by the number of dispensers it can fill.

The big bottle contains [tex]2\frac{1}{3}[/tex] liters of liquid soap, which can fill 3 1/2 dispensers. We need to find the amount of soap that goes into one dispenser.

To find the amount of soap per dispenser, we divide the total amount of soap ([tex]2\frac{1}{3}[/tex] iters) by the number of dispensers ([tex]3\frac{1}{2}[/tex]).

First, we need to convert the mixed numbers into improper fractions:

[tex]2\frac{1}{3}[/tex] = (2 * 3 + 1) / 3 = 7/3

[tex]3\frac{1}{2}[/tex] = (3 * 2 + 1) / 2 = 7/2

Now, we divide 7/3 by 7/2:

(7/3) / (7/2) = (7/3) * (2/7) = (2/3)

Therefore, one dispenser can hold approximately 0.6667 liters of soap, or 2/3 of a liter.

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A linear equation that models the situation at the Red Door Escape Room, where participants are charged $28 per person for a fully immersive game, can be expressed as y = 28x, where y represents the total cost and x represents the number of participants.

To model the situation mathematically, we can use a linear equation, which represents a straight line on a graph. In this case, the equation y = 28x can be used, where y represents the total cost and x represents the number of participants.

In the equation, the coefficient 28 represents the cost per person. By multiplying the number of participants, x, by this coefficient, we can determine the total cost, y. This linear equation assumes a constant rate of $28 per person and does not take into account any additional fees or discounts.

For example, if there are 4 participants, we can substitute x with 4 in the equation: y = 28 * 4 = 112. This means that the total cost for 4 participants would be $112. Similarly, if there are 6 participants, the total cost would be $168 (28 * 6).

By using this linear equation, the Red Door Escape Room can calculate the total cost based on the number of participants, allowing them to effectively manage their pricing structure and revenue.

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The tax revenue that Australia generate each year by instituting a income tax is $96,054,697,991. The Option C.

Tax revenue is the income that is collected by governments through taxation. To know the tax revenue, we will multiply the working population by the average salary and then multiply that by the tax rate.

Tax Revenue = (Working population) * (Average salary) * (Tax rate)

Tax Revenue = 11,565,470 * $26,450 * 0.314

Tax Revenue = $96,054,697,991

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The expected payout is 5.625 cents, and the cost to play the game is 7 cents, it can be concluded that paying 7 cents to play this game is not fair. The expected payout is lower than the cost, resulting in a disadvantage for the player.

In this game, tossing 3 fair coins results in different payouts for the number of heads obtained. The payouts are 12 cents for 3 heads, 7 cents for 2 heads, and 4 cents for 1 head. The question is whether paying 7 cents to play this game is fair.

To determine if the game is fair, we need to compare the expected payout with the cost to play. Let's calculate the probabilities and payouts for each outcome. There are a total of 8 possible outcomes when tossing 3 coins: HHH, HHT, HTH, THH, TTH, THT, HTT, and TTT (H denotes a head, and T denotes a tail).

The probability of getting 3 heads is 1/8, so the payout for this outcome is 12 cents. The probability of getting 2 heads is 3/8 (HHH, HHT, HTH), so the payout for this outcome is 7 cents. The probability of getting 1 head is also 3/8 (TTH, THT, HTT), resulting in a payout of 4 cents. The probability of getting 0 heads (3 tails) is 1/8, resulting in a payout of 0 cents.

Now, let's calculate the expected payout by multiplying each outcome's probability with its corresponding payout and summing them up:

Expected payout = (1/8 * 12) + (3/8 * 7) + (3/8 * 4) + (1/8 * 0) = 1.5 + 2.625 + 1.5 + 0 = 5.625 cents.

Since the expected payout is 5.625 cents, and the cost to play the game is 7 cents, it can be concluded that paying 7 cents to play this game is not fair. The expected payout is lower than the cost, resulting in a disadvantage for the player.

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The calculted ratio of the side lengths is 2 : 3

From the question, we have the following parameters that can be used in our computation:

Using the above as a guide, we have the following:

Ratio = Smaller box : Larger box

So, we have

Ratio = 12 inches : 18 inches

Simplify the ratio

Ratio = 2 : 3

Hence, the ratio is 2 : 3

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Question

A company is experimenting with two new boxes for packaging merchandise. Each box is a cube with the side lengths shown. (smaller box is 12 in, larger box is 18 in.)

What is the ratio of the side lengths of the smaller box to the side lengths of the larger box in lowest terms?