A company sells boxes of cow bells (b) for $20 and boxes of air horns (h) for $30. They can make a batch of cow bells that fills 8 boxes or a batch of air horns that fills 9 boxes. The company only has 53 boxes. Which system of equations helps the company plan to make $275?

Answer:

What is Alberto’s average speed during the race?

216   meters per minute

Based on the linear model, which is the best prediction of how long it will take Alberto to finish the 10-kilometer race?

B. 46 minutes

A line perpendicular to a plane, would intersect the plane at one point.

When a line is perpendicular directly away from the plane, the line will tend to intersect the plane at one points or single points.

The reason why the line intersect the plane is because the line cannot point to other places except directly away from the plane.

Therefore a line perpendicular to a plane, would intersect the plane at one point.

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The angle bisector of a given angle divides it into two equal parts. If GH is the angle bisector of FGI, angle FGH and angle HGI will be equal.

If GH is the angle bisector of FGI, it means that it splits the angle FGI into two equal parts. Hence the angles FGH and HGI are equal.

For example, if angle FGI is 60 degrees, then the angle FGH and HGI (formed as a result of the bisector) would each be 30 degrees because the bisector divides the 60 degrees into two equal parts. This is the fundamental concept of an angle bisector in geometry.

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we have

[tex]26 + 6b\geq2(3b + 4)[/tex]

Applying the distributive property on the right side

[tex]26 + 6b\geq6b+8[/tex]

subtract [tex]6b[/tex] from both sides

[tex]26\geq 8[/tex] -------> is true

for all real numbers the inequality is true

therefore

the graph is a shaded area everywhere.

the answer is

the solution is all real numbers

The solution is all real numbers.

It is required to find the solution.

The relation between two expressions that are not equal, employing a sign such as ≠ ‘not equal to’, > ‘greater than’, or < ‘less than’.

Given:

Applying the distributive property on the right side

26+6b≥6b+8

Then subtract 6b from both sides we get,

26≥8

For all real numbers the inequality is true.

Therefore, the solution is all real numbers.

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The number of 18 inches of wreaths sold was 9 while 22 inches were 51.

Determine the known quantities and designate the unknown quantity as a variable while trying to set up or construct a linear equation to fit a real-world application.

In other words, an equation is a set of variables that are constrained through a situation or case.

Let's say a number of 18 inches of wreaths is x while 12 inches is y.

Given that,

In one day, the number of 22-inch wreaths sold was six more than five times the number of 18-inch wreaths.

So,

y = 5x + 6

And

Total amount

15x + 35y = 1920

⇒ 3x + 7y = 384

By substitution,

3x + 7(5x + 6) = 384

38x = 342

x = 9

So y = 5(9) + 6 = 51

Hence "The number of 18 inches of wreaths sold was 9 while 22 inches were 51".

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The given question is incorrect, the correct question is ;

A store sells two sizes of fresh wreaths. An 18-inch wreath costs $15, and a 22-inch wreath costs $35. In one day, the number of 22-inch wreaths sold was six more than five times the number of 18-inch wreaths, for a total of $1920. How many of each were sold? .... The number of 18-inch wreaths sold was and the number of 22-inch wreaths sold was

The equation of the function is [tex]y = \frac 16(x -2)(x -3)(x -5)[/tex], and the y-intercept of the function is -5

A cubic function is represented as:

[tex]y = a(x -x_1)(x -x_2)(x -x_3)[/tex]

The zeros are (2, 0), (3, 0), and (5, 0).

This means that:

(x1, y) = (2, 0)

(x2, y) = (3, 0)

(x3,y) = (5, 0)

So, we have:

[tex]y = a(x -2)(x -3)(x -5)[/tex]

The graph passes through the point (0,-5).

So, we have:

[tex]-5 = a(0 -2)(0 -3)(0 -5)[/tex]

Evaluate the products

[tex]-5 = -30a[/tex]

Solve for a

[tex]a = \frac{5}{30}[/tex]

[tex]a = \frac{1}{6}[/tex]

Substitute 1/6 for a in [tex]y = a(x -2)(x -3)(x -5)[/tex]

[tex]y = \frac 16(x -2)(x -3)(x -5)[/tex]

The y-intercept of the function is when x = 0.

Hence, the y-intercept of the function is -5

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divide

4915/72 = 68.2638

 so $68.26 per stock is the unit rate

Answer:

Maximum number of watches Samantha can buy equals:

10

Step-by-step explanation:

Samantha wants to use her savings of $1150 to buy shirts and watches for her family.

The total price of the shirts she bought was $84.

The watches cost $99 each.

Let she bought x watches

then, 84+99x≤1150

subtracting by 84 on both sides, we get

99x≤1066

dividing both sides by 99, we get

x≤ 10.7676

Hence, maximum number of watches Samantha can buy equals:

10

when dividing subtract the powers

 so  you would do 6-2 = 4

 so b = 4

Answer:

The value of b is 4.

Step-by-step explanation:

The given equation is

[tex]\frac{5^6}{5^2}=a^b[/tex]

According to the property of exponent,

[tex]\frac{x^a}{x^b}=x^{a-b}[/tex]

Using this property of exponent, the given equation can be written as

[tex]5^{6-2}=a^b[/tex]

[tex]5^{4}=a^b[/tex]

On comparing both the sides, we get

[tex]a=5,b=4[/tex]

Therefore the value of b is 4.

opposite angels = 180

 so 6m+13 +4m+7 =180

combine like terms

10m+20=180

10m =160

m=160/10 = 16

Angle M = 6m = 6(16) = 96 degrees

Answer: A. 17.32m

Step-by-step explanation:

Just took edge test

Answer:A

Step-by-step explanation:

1 mile =1.61km

60 minutes per hour

60/4 = 15 ( he can run 15 miles in one hour)

15 x 1.61 = 24.15 km per hour

round your answer if needed

The man's average speed in kilometers per hour is calculated by first converting the distance the man runs to kilometers, based on the 1 mile equals 1.61 kilometers conversion factor, and then converting time to hours, based on the 60 minutes in 1 hour conversion factor. The calculated speed is approximately 24.04 kilometers per hour.

The man runs a mile in 4 minutes. Given that 1 mile equals 1.61 kilometers, we can first change the distance the man runs into kilometers: 1 mile * 1.61 km/mile = 1.61 km. Thus, the man's speed is 1.61 km per 4 minutes.

To convert this speed into kilometers per hour, we need to convert the time from minutes to hours. We know that 1 hour is equivalent to 60 minutes, so 4 minutes is equivalent to 4/60 = 0.067 hours. Therefore, the man's average speed in kilometers per hour is 1.61 km divided by 0.067 hours, which equals about 24.04 km/hr.

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The value of solution of expression is, a = 2

We have to give that,

An expression to simplify,

4a + 3 = 11

Now, Simplify the expression by combining like terms as,

4a + 3 = 11

Subtract 3 on both sides,

4a + 3 - 3 = 11 - 3

4a = 8

Divide 4 into both sides,

a = 8/4

a = 2

Therefore, the solution is, a = 2

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The 30th percentile for the given data set is 5758.8, calculated by arranging the data in ascending order and interpolating between the 3rd and 4th values.

To find the 30th percentile for the given data set, first arrange the data in ascending order and then calculate the rank of the 30th percentile. The formula to find the kth percentile for a data set with n observations is:

Rank = (k/100) * (n + 1)

For the given data set of 10 values, the 30th percentile rank would be:

Rank = (30/100) * (10 + 1) = 3.3

Since the rank is not a whole number, the 30th percentile lies between the 3rd and 4th values in the ordered set. After arranging the data:

5581

5700

5700

5896

5972

5993

6075

6274

6283

6381

The 3rd and 4th values are 5700 and 5896. We must interpolate to find the exact 30th percentile:

30th Percentile = 5700 + 0.3 * (5896 - 5700) = 5700 + 0.3 * 196 = 5700 + 58.8 = 5758.8

The 30th percentile is 5758.8.

The correct quadratic equation representing the area of the book cover is [tex]\( x(x - 3) = 63.8 \)[/tex].

To understand why this is the correct equation, let's break down the information given in the question:

1. The area of the book cover is given as 63.8 square inches.

2. The width of the book is the difference between the length and 3 inches. If we let [tex]\( x \)[/tex] represent the length of the book, then the width can be represented as [tex]\( x - 3 \)[/tex].

3. The area of a rectangle (which is the shape of the book cover) is calculated by multiplying its length by its width.

Using the information above, we can set up the equation for the area of the book cover as follows:

[tex]\[ \text{Area} = \text{length} \times \text{width} \][/tex]

[tex]\[ 63.8 = x \times (x - 3) \][/tex]

Expanding the right side of the equation, we get:

[tex]\[ 63.8 = x^2 - 3x \][/tex]

This is a quadratic equation in standard form. The other options given do not correctly represent the relationship between the length, width, and area of the book cover:

[tex]- \( x(3 - x) = 63.8 \)[/tex] incorrectly represents the width as [tex]\( 3 - x \)[/tex] instead of [tex]\( x - 3 \)[/tex].

[tex]- \( 2x - 3 = 63.8 \)[/tex] is a linear equation, not a quadratic one, and does not represent the area calculation.

[tex]- \( x + x - 3 = 63.8 \)[/tex] simplifies to [tex]\( 2x - 3 = 63.8 \)[/tex], which is also a linear equation and does not represent the area calculation.