High School Math : High School Math

Study concepts, example questions & explanations for High School Math

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Example Questions

Example Question #215 : Plane Geometry

Rectangle

Find the area of a rectangle with a length of  and a length of .

Possible Answers:

Correct answer:

Explanation:

First, we need to convert the length and width of the rectangle into similiar units.

Now, calculate the area.

Example Question #572 : High School Math

Rectangle_with_diagonal

A rectangle has a diagonal of  and a width of . What is the area of the rectangle?

Possible Answers:

Not enough information to solve

Correct answer:

Explanation:

We are given the rectangle's diagonal  and width  and are asked to find its area. The diagonal forms two right triangles within the rectangle; therefore, we can use the Pythagorean theorem to find the length of the rectangle's missing side. Then we can use the formula  to find the are of the rectangle.

In our case, we can rename the variables to match our triangle.

Now we can calculate the area.

Example Question #573 : High School Math

Joe has a rectangluar yard and wants to fence in his yard as well as plant grass seed.  His yard measures .  The fence costs per foot, and the grass seed costs per square foot.  How much money does he need to complete both projects?

Possible Answers:

Correct answer:

Explanation:

This problem requires you to find both the perimeter (fence) and the area (grass seed) of a rectangle where and .

Fence Problem (Perimeter):

Grass Seed Problem (Area):

So the total cost for both projects is .

Example Question #31 : Rectangles

A rectangle has sides of  units and  units. If the perimeter of the rectangle is  units, what is its area?

Possible Answers:

 units squared

 units squared

 units squared

 units squared

 units squared

Correct answer:

 units squared

Explanation:

Since a rectangle has  pairs of equal-length sides, multiplying each side by  and adding the products together gives the perimeter of the rectangle. Use this fact to set up an equation with the given information about the rectangle's sides and perimeter. Solving for  in this equation will provide necessary information for finding the rectangle's area:

Multiplying the measure of the long side of the rectangle by the measure of the short side of the rectangle gives the rectangle's area. The length of the long side is given by substituting the solution for  into the given expression  that defines its length. The short side is , giving the following equation to calculate the area:

 units squared

Example Question #575 : High School Math

The ratio of the areas of two rectangles is . If the larger rectangle has a length of  and a width of , what is the area of the smaller rectangle? 

Possible Answers:

 units squared

 units squared

 units squared

 units squared

 units squared

Correct answer:

 units squared

Explanation:

The area of the larger rectangle is calculated as  units squared. Since the ratio of the larger to the smaller rectangle is , dividing the larger rectangle's area by  gives the area of the smaller rectangle:

 units squared

Example Question #576 : High School Math

Joey is working in his yard.  In the middle of his rectangular yard he places a round cement fountain.  The fountain has a diameter of .  One bag of grass seed covers square feet.  How many bags of grass seed will Joey need to cover his yard?

Possible Answers:

Correct answer:

Explanation:

First, find the area of the rectangular yard:

 square feet

Next, find the area of the round cement fountain:

square feet

Then find the difference between the two:

square feet

Now, to get the number of grass seed bags needed, divide the area by to get approximately bags.  Because one can't purchase a partial bag, the correct answer is the next largest whole number, or bags of grass seed.

Example Question #1 : Rectangles

 

A rectangle has a perimeter of 40 inches.  It is 3 times as long as it is wide.  What is the area of the rectangle in square inches?

 

 

Possible Answers:

45

60

75

86

Correct answer:

75

Explanation:

The width of the rectangle is w, therefore the length is 3w.  The perimeter, P, can then be described as P = w + w + 3w +3w

                                                                                          40 = 8w

                                                                                          w = 5

                                                                                          width = 5, length = 3w = 15

                                                                                          A = 5*15 = 75 square inches

 

 

Example Question #571 : High School Math

Angela is carpeting a rectangular conference room that measures 20 feet by 30 feet. If carpet comes in rectangular pieces that measures 5 feet by 4 feet, how many carpet pieces will she need to carpet the entire room?

Possible Answers:

31

600

30

20

29

Correct answer:

30

Explanation:

First, we need to find the area of the room. Because the room is rectangular, we can multiply 20 feet by 30 feet, which is 600 square feet. Next, we need to know how much space one carpet piece covers. Because the carpet pieces are also rectangular, we can multiply 4 feet by 5 feet to get 20 feet. To determine how many pieces of carpet Angela will need, we must divide the total square footage of the room (600 feet) by the square footage covered by one carpet piece (20 feet). 600 divided by 20 is 30, so Angela will need 30 carpet pieces to carpet the entire room.

Example Question #3 : How To Find The Area Of A Rectangle

If the width of a rectangle is 8 inches, and the length is half the width, what is the area of the rectangle in square inches?

Possible Answers:

20

64

12

32

16

Correct answer:

32

Explanation:

the length of the rectangle is half the width, and the width is 8, so the length must be half of 8, which is 4.

 

The area of the rectangle can be determined from multiplying length by width, so,

4 x 8 = 32 inches squared

Example Question #4 : How To Find The Area Of A Rectangle

If Mrs. Stietz has a patio that measures 96 inches by 72 inches and she wants to cover it with stone tiles that measure one foot by half a foot, what is the minimum number of tiles she needs to cover the patio?

Possible Answers:

6912

12

14

96

48

Correct answer:

96

Explanation:

96. Converting the dimensions of the tiles to inches, they each measure 12 inches by 6 inches.  This means that there need to be 8 tiles to span the length of the patio, and 6 tiles to span the width of the patio.  She needs to cover the entire area, so we can multiply 8 times 12 to get 96, the number of tiles she needs for the patio.

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