What is the difference?
9/5-1/6

The 24-inch pizza is a better deal because it costs slightly less per square inch compared to the 12-inch pizza.

To determine which pizza is a better deal, we need to compare their prices per square inch. First, let's find the area of the 12-inch pizza. The formula to find the area of a square is side length squared, so the area of the 12-inch pizza is 12 x 12 = 144 square inches. Now, we can divide the price of the 12-inch pizza by its area to find the price per square inch: $3.95 / 144 = $0.0274 per square inch.

Next, let's find the area of the 24-inch pizza. The area of the 24-inch pizza is 24 x 24 = 576 square inches. Now, we can divide the price of the 24-inch pizza by its area to find the price per square inch: $14.95 / 576 = $0.0259 per square inch.

Comparing the prices per square inch, we can see that the 24-inch pizza is a better deal, as it costs slightly less per square inch compared to the 12-inch pizza.

The statement given is

  The population of Vermont was estimated to be about 620,000 in 2008.

Exact population of Vermont in 2008

                   = 615,000 ≤ A number between ≤ 620,000

                    =[615000, 620000]

The total cost of the haircut including the tip is $20.70. 18*15%=2.70+18=20.7.

Hope this helps:)

Answer:

$20.70

Step-by-step explanation:

Turn the % to a decimal.

15%= 15/100 = 0.15

Multiply the total and decimal.

18.00 x 0.15

= 2.70

Add the total to the sum.

18.00 + 2.70

= 20.70

(hope it helped please vote and say thanks <3)

The angular speed of the wheel is 3960 rad/min and the revolutions per minute is 630 rpm.

The velocity of the truck is 60 mph. We need to convert this speed to inches per minute.

1 mile = 63360 in, 1 hour = 60 minutes

Hence:

60 mph = (60 mile * 63360 in/mi) / (1 hr * 60 min/hr) = 63360 in/min

The diameter = 32 in, hence radius = 32/2 = 16 in

The angular speed = 63360 in/min ÷ 16 in = 3960 rad/min

Revolution per minute = 3960 rad/min ÷ 2π = 630 rpm

Hence the angular speed of the wheel is 3960 rad/min and the revolutions per minute is 630 rpm.

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The wheels make approximately  52.55  revolutions per minute.

To find the angular speed of the wheels in radians per minute, we first need to find the linear speed of a point on the edge of the wheel.

The formula to calculate the linear speed (v) is given by:

[tex]\[ v = r \times \omega \][/tex]

Where:

-  v  is the linear speed,

-  r  is the radius of the wheel, and

- [tex]\( \omega \)[/tex] is the angular speed in radians per second.

Given that the diameter of the wheels is 32 inches, the radius (r ) is half of the diameter, so [tex]\( r = \frac{32}{2} = 16 \)[/tex] inches.

We are given the speed of the truck,  v = 60  mi/h. To convert this to inches per minute, we need to convert miles to inches and hours to minutes:

[tex]\[ 60 \text{ miles/h} = 60 \times 5280 \text{ inches/60 minutes} = 5280 \text{ inches/minute} \][/tex]

Now, we can rearrange the formula to solve for [tex]\( \omega \):[/tex]

[tex]\[ \omega = \frac{v}{r} \][/tex]

Substituting the known values:

[tex]\[ \omega = \frac{5280 \text{ inches/minute}}{16 \text{ inches}} \]\[ \omega = 330 \text{ radians/minute} \][/tex]

So, the angular speed of the wheels is 330 radians per minute.

Now, to find the number of revolutions per minute (rpm), we need to convert the angular speed from radians per minute to revolutions per minute. Since [tex]\( 2\pi \)[/tex] radians is equal to one revolution, we have:

[tex]\[ \text{Revolutions per minute (rpm)} = \frac{\omega}{2\pi} \][/tex]

Substituting the value of [tex]\( \omega \):[/tex]

[tex]\[ \text{rpm} = \frac{330}{2\pi} \]\[ \text{rpm} \approx \frac{330}{6.28} \approx 52.55 \][/tex]

So, the wheels make approximately  52.55  revolutions per minute.

The possible range of numbers of cars Ken might have is 0 ≤ Ken ≤ 24.

a relationship between two expressions or values that are not equal to each other is called 'inequality.

Jed has 25 toy cars.

Kai has 32 you cars.

Since Ken has fewer cars than either Jed or Kai, the maximum number of cars Ken could have is 24 (if both Jed and Kai give him one car each).

The minimum number of cars Ken could have is 0 (if both Jed and Kai have more cars than Ken).

So the possible range of numbers of cars Ken might have is 0 ≤ Ken ≤ 24.

Hence,  the possible range of numbers of cars Ken might have is 0 ≤ Ken ≤ 24.

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Final answer:

To find the indifference curve passing through 32 apples and 8 bananas, we can set up a system of equations and solve for the relationship between apples and bananas. The indifference curve will also pass through the point where Charlie consumes 4 apples and 2 bananas.

Explanation:

An indifference curve represents a set of choices that have the same level of utility. In this case, Charlie's utility function is u(xa, xb)=xaxb. To find the indifference curve passing through 32 apples and 8 bananas, we can set up a system of equations. If we plug in these points into the utility function, we get 32a*8b=4a*xb. Solving for b, we find that b=1/2a. This means that for every amount of apples, Charlie wants to consume half as many bananas to maintain the same level of utility. Therefore, the indifference curve passing through 32 apples and 8 bananas will also pass through the point where he consumes 4 apples and 2 bananas.

divide 279 by 3

279 / 3 = 93

93-2 = 91

first number = 91

N +2 = 91 +2 = 93

N+4 = 91 +4 = 95

91 + 93 +95 =279

Number of ways it can happen is 5832.

Multiplication of two numbers is defined as the addition of one of the number repeatedly until the times of the other number.

a × b means that a is added to itself b times or b is added to itself a times.

We have eighteen-sided die is rolled three times.

When the die is first rolled, there are 18 possibilities of outcomes.

Again when the die is rolled, again there are 18 possibilities.

In the third rolling also, there are 18 possibilities.

Each die has 18 possibilities of numbers for a number for the other die.

Total number of sets = 18 × 18 × 18

                                   = 5832

Hence the total number of ways that the numbers can be formed is 5832.

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The solution to the given inequality problem is;

q < 56

We are given the equation;

q + 12 - 2(q - 22) > 0

Step 1; Using distributive property, distribute 6 to the numbers inside the bracket to get;

q + 12 - 2q + 44 > 0

Step 2; Combining similar terms on the left side and simplifying gives us;

56 - q > 0

Step 3; Using addition property of equality, add q to both sides;

56 - q + q > 0 + q

q < 56

Thus, the final solution is q < 56

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The implicit equation for the plane passing through the point (5,0,5) that is perpendicular to the line l(t)=⟨3,−1−5t,−1−2t⟩ is 3x - 5y - 2z = 20.

To find the equation of the plane passing through the point (5,0,5) and perpendicular to the line l(t)=⟨3,−1−5t,−1−2t⟩, we need to find the normal vector of the plane. The normal vector is the direction vector of the line, which is (3, -5, -2). Using the formula for the equation of a plane in standard form, which is ax + by + cz = d, and substituting the coordinates of the point and the normal vector, we get 3x - 5y - 2z = 20

as the implicit equation for the plane.

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Answer:

Step-by-step explanation:

[tex]6x^2-17x+5[/tex]

This can be written as

[tex]6x^2-15x-2x+5[/tex]

Because -15-2=-17 and also (-15)(-2)=30

so now we have two pairs

[tex](6x^2-15x)+(-2x+5)[/tex]

Take out GCF from each pair

[tex]3x(2x-5)-1(2x-5)[/tex]

since (2x-5) is now the common factor so final factored form

[tex](3x-1)(2x-5)[/tex]

The equation 6(a+3) = 18+6a is an identity after canceling out like terms on both sides, which implies that the solution for 'a' is all real numbers.

To solve for a in the equation 6(a+3) = 18+6a, we begin by expanding the left side of the equation:

6a + 18 = 18 + 6a

We notice that there are terms on both sides of the equation that can be cancelled out. The 6a on the left side can be subtracted from both sides, as well as the constant 18.

After cancelling out these terms, we are left with:

0 = 0

This equation suggests that the original equation is an identity, meaning that the value of a can be any real number, as the original equation holds true for all values of a.

The width of the rectangle is 3 inches less than twice the length, which is represented by L. The algebraic expression for the width is W = 2L - 3.

The width of a rectangle is described in the problem as being 3 inches less than twice the length of the rectangle. If the length of the rectangle is denoted by L, the algebraic expression to represent the width (W) can be written as:

W = 2L - 3

To clarify, this expression means that whatever the length L is, you would double it (that's the 2L part), and then subtract 3 inches to find the width of the rectangle.

The number that fits all the given criteria is 3955, where all digits are odd, the last two add to 10, the first and last to 8, and the first two to 12.

To find a number where all digits are odd, the last two digits add up to make ten, the first and last digits add up to eight, and the first two digits add up to twelve, we can use a process of elimination and reasoning.

Therefore, the number is 3955.