SAT Math : Plane Geometry

Study concepts, example questions & explanations for SAT Math

varsity tutors app store varsity tutors android store varsity tutors ibooks store

Example Questions

Example Question #2 : How To Find Circumference

A circle with an area of 13π in2 is centered at point C. What is the circumference of this circle?

Possible Answers:

√13π

26π

13π

√26π

2√13π

Correct answer:

2√13π

Explanation:

The formula for the area of a circle is πr2.

We are given the area, and by substitution we know that 13π πr2.

We divide out the π and are left with 13 = r2.

We take the square root of r to find that r = √13.

We find the circumference of the circle with the formula = 2πr.

We then plug in our values to find = 2√13π.

Example Question #341 : Plane Geometry

A 6 by 8 rectangle is inscribed in a circle. What is the circumference of the circle?

Possible Answers:

12π

10π

6π

25π

8π

Correct answer:

10π

Explanation:

First you must draw the diagram. The diagonal of the rectangle is also the diameter of the circle. The diagonal is the hypotenuse of a multiple of 2 of a 3,4,5 triangle, and therefore is 10.
Circumference = π * diameter = 10π.

Example Question #342 : Plane Geometry

A gardener wants to build a fence around their garden shown below. How many feet of fencing will they need, if the length of the rectangular side is 12 and the width is 8?

 
   

 

 Screen_shot_2013-03-18_at_4.54.03_pm

                 

 

 

Possible Answers:

4π + 24

96 ft

8π + 24

40 ft.

Correct answer:

8π + 24

Explanation:

The shape of the garden consists of a rectangle and two semi-circles. Since they are building a fence we need to find the perimeter. The perimeter of the length of the rectangle is 24. The perimeter or circumference of the circle can be found using the equation C=2π(r), where r= the radius of the circle. Since we have two semi-circles we can find the circumference of one whole circle with a radius of 4, which would be 8π.

 

 

 

 

Example Question #121 : Plane Geometry

The diameter of a circle is defined by the two points (2,5) and (4,6). What is the circumference of this circle?

Possible Answers:

None of the other answers

π√5

π√2.5

2.5π

Correct answer:

π√5

Explanation:

We first must calculate the distance between these two points. Recall that the distance formula is:√((x2 - x1)2 + (y2 - y1)2)

For us, it is therefore: √((4 - 2)2 + (6 - 5)2) = √((2)2 + (1)2) = √(4 + 1) = √5

If d = √5, the circumference of our circle is πd, or π√5.

Example Question #343 : Plane Geometry

A car tire has a radius of 18 inches. When the tire has made 200 revolutions, how far has the car gone in feet?

Possible Answers:

300π

600π

500π

3600π

Correct answer:

600π

Explanation:

If the radius is 18 inches, the diameter is 3 feet. The circumference of the tire is therefore 3π by C=d(π). After 200 revolutions, the tire and car have gone 3π x 200 = 600π feet.

Example Question #51 : Plane Geometry

A circle has the equation below. What is the circumference of the circle?

(x – 2)2 + (y + 3)2 = 9

Possible Answers:

Correct answer:

Explanation:

The radius is 3. Yielding a circumference of .

Example Question #6 : How To Find Circumference

Find the circumferencce fo a circle given radius of 7.

Possible Answers:

Correct answer:

Explanation:

To solve, simply use the formula for the circumference of a circle. Thus,

Like the prior question, it is important to think about dimensions if you don't remember the exact formula. Circumference is 1 dimensional, so it makes sense that the variable is not squared as cubed. If you rather, you can use the following formula, but realize by defining diameter, it equals the prior one.

Thus,

Example Question #7 : How To Find Circumference

The area of a circle is . What is its circumference? 

Possible Answers:

None of the given answers. 

Correct answer:

Explanation:

First, let's find the radius r of the circle by using the given area.

Now, plug this radius into the formula for a circle's circumference.

Example Question #5 : How To Find Circumference

The surface area of a sphere is .

 is a point on the surface of the sphere;  is the point on the sphere farthest from . A curve is drawn from  to  entirely on the surface of the sphere. Give the length of the shortest possible curve fitting this description.

Possible Answers:

Correct answer:

Explanation:

Below is a sphere with its center  and with points  and  as described.

Sphere

For  and  to be on the surface of the sphere and to be a maximum distance apart, they must be endpoints of a diameter of the sphere. The shortest curve connecting them that is entirely on the surface is a semicircle whose radius coincides with that of the sphere. Therefore, first find the radius of the sphere using the surface area formula

Setting  and solving for :

The length of the curve is half the circumference of a circle with radius 10, or

Substituting 10 for , this is 

.

Example Question #101 : Circles

Give the circumference of a circle with the following diameter:

Possible Answers:

Correct answer:

Explanation:

The circumference of a circle is its diameter multiplied by , so, since the diameter is 100, the circumference is simply .

Learning Tools by Varsity Tutors