All GMAT Math Resources
Example Questions
Example Question #4 : Calculating The Length Of An Arc
Consider the Circle :
(Figure not drawn to scale.)
Suppose is . What is the measure of arc in meters?
To find arc length, multiply the total circumference of a circle by the the fraction of the total circle that defines the arc with the length for which you are solving.
In this case, to find the total circumference:
To find the fraction with which we are concerned, make a fraction with the number of degrees in in the numerator and the total degrees in a circle in the denominator:
Multiply together and simplify:
Example Question #1 : Calculating The Length Of An Arc
What is the arc length for a sector with a central angle of if the radius of the circle is ?
Using the formula for arc length, we can plug in the given angle and radius to calculate the length of the arc that subtends the central angle of the sector. The angle, however, must be in radians, so we make sure to convert degrees accordingly by multiplying the given angle by :
Example Question #6 : Calculating The Length Of An Arc
The arc of a circle measures . The chord of the arc, , has length . Give the length of the arc .
Examine the figure below, which shows the arc and chord in question.
If we extend the figure to depict the circle as the composite of four quarter-circles, each a arc, we see that is also the side of an inscribed square. A diagonal of this square, which measures times this sidelength, or
,
is a diameter of this circle. The circumference is times the diameter, or
.
Since a arc is one fourth of a circle, the length of arc is
Example Question #1 : Calculating The Angle Of A Sector
Note: Figure NOT drawn to scale.
.
Order the degree measures of the arcs from least to greatest.
, so, by the Multiplication Property of Inequality,
.
The degree measure of an arc is twice that of the inscribed angle that intercepts it, so the above can be rewritten as
.
Example Question #21 : Geometry
In the figure shown below, line segment passes through the center of the circle and has a length of . Points , , and are on the circle. Sector covers of the total area of the circle. Answer the following questions regarding this shape.
Find the value of central angle .
Here we need to recall the total degree measure of a circle. A circle always has exactly degrees.
Knowing this, we need to utilize two other clues to find the degree measure of .
1) Angle measures degrees, because it is made up of line segment , which is a straight line.
2) Angle can be found by using the following equation. Because we are given the fractional value of its area, we can construct a ratio to solve for angle :
So, to find angle , we just need to subtract our other values from :
So, .
Example Question #262 : Problem Solving Questions
The radius of Circle A is equal to the perimeter of Square B. A sector of Circle A has the same area as Square B. Which of the following is the degree measure of this sector?
Call the length of a side of Square B . Its perimeter is , which is the radius of Circle A.
The area of the circle is ; that of the square is . Therefore, a sector of the circle with area will be of the circle, which is a sector of measure
Example Question #2 : Calculating The Angle Of A Sector
Angle is . What is angle ?
This is the kind of question we can't get right if we don't know the trick. In a circle, the size of an angle at the center of the circle, formed by two segments intercepting an arc, is twice the size of the angle formed by two lines intercepting the same arc, provided one of these lines is the diameter of the circle. in other words, is twice .
Thus,
Example Question #261 : Gmat Quantitative Reasoning
are evenly spaced points on the circle. What is angle ?
We can see that the points devide the of the circle in 5 equal portions.
The final answer is given simply by which is , this is the angle of a slice of a pizza cut in 5 parts if you will!
Example Question #264 : Problem Solving Questions
The points and are evenly spaced on the circle of center . What is the size of angle ?
As we have seen previously, the 6 points divide the of the circle in 6 portion of same angle. Each portion form an angle of or 60 degrees. As we also have previously seen, the angle formed by the lines intercepting an arc is twice more at the center of the circle than at the intersection of the lines intercepting the same arc with the circle, provided one of these lines is the diameter. In other words, . Since is 60 degrees, than, must be 30 degrees, this is our final answer.
Example Question #21 : Circles
A circle is inscribed in a square with area 100. What is the area of the circle?
Not enough information.
A square with area 100 would have a side length of 10, which is the diameter of the circle. The area of a circle is , so the answer is .