All SAT II Math I Resources
Example Questions
Example Question #6 : Advanced Geometry
If the surface area of cone is , and the distance between the cone's tip and a point on the cone's circular base is , what is the radius of the cone?
To find out the radius, we must use our knowledge of the formula for the surface area of a cone: , where is the radius of the cone and is the distance from the tip of the cone to any point along the circumference of the cone's base. We can plug in what we already know into the above equation:
We can divide out from each term to obtain:
We now can recognize that the above is a quadratic expression, so to solve for we can find the zeroes of the equation by factoring. We need two numbers which will multiply to but will add to (in this case and ). Therefore, we can factor the above to the following:
.
Our two solutions are therefore and . Since represents the radius of the base of the cone, it must be positive, and that leaves as our one and only answer.
Example Question #1 : Advanced Geometry
Find the surface area of a cone with a base diameter of and a slant height of .
The Surface Area of a cone is:
Given the base diameter is 6, the radius will be 3. The given slant height is 10.
Substitute the radius and slant height into the equation to find surface area.
Example Question #2 : Advanced Geometry
Find the surface area of a cone with a base area of and a slant height of .
The surface area of a cone is:
Given the base area is , the base of the cone resembles a circle. Using the base area, it is necessary to find the radius.
Since radius of the base is 2, and slant height is 6, substitute these into the surface area equation.
Example Question #1 : Advanced Geometry
Find the surface area of a cone with a base diameter of and a height of .
The Surface Area of a cone is:
Given the base diameter is 6, the radius of the base is 3. The height is 10. We will substitute these values to find the slant height by using the Pythagorean Theorem.
Substitute slant height and radius into the Surface Area equation.
Example Question #162 : Solid Geometry
What is the surface area of a cone with a radius of 4 and a height of 3?
Here we simply need to remember the formula for the surface area of a cone and plug in our values for the radius and height.
Example Question #163 : Solid Geometry
The lateral area is twice as big as the base area of a cone. If the height of the cone is 9, what is the entire surface area (base area plus lateral area)?
54π
9π
81π
90π
27π
81π
Lateral Area = LA = π(r)(l) where r = radius of the base and l = slant height
LA = 2B
π(r)(l) = 2π(r2)
rl = 2r2
l = 2r
From the diagram, we can see that r2 + h2 = l2. Since h = 9 and l = 2r, some substitution yields
r2 + 92 = (2r)2
r2 + 81 = 4r2
81 = 3r2
27 = r2
B = π(r2) = 27π
LA = 2B = 2(27π) = 54π
SA = B + LA = 81π
Example Question #171 : Solid Geometry
A right cone has a radius of 4R and a height of 3R. What is the ratio of the total surface area of the cone to the surface area of just the base?
We need to find total surface area of the cone and the area of the base.
The area of the base of a cone is equal to the area of a circle. The formula for the area of a circle is given below:
, where r is the length of the radius.
In the case of this cone, the radius is equal to 4R, so we must replace r with 4R.
To find the total area of the cone, we need the area of the base and the lateral surface area of the cone. The lateral surface area (LA) of a cone is given by the following formula:
, where r is the radius and l is the slant height.
We know that r = 4R. What we need now is the slant height, which is the distance from the edge of the base of the cone to the tip.
In order to find the slant height, we need to construct a right triangle with the legs equal to the height and the radius of the cone. The slant height will be the hypotenuse of this triangle. We can use the Pythagorean Theorem to find an expression for l. According to the Pythagorean Theorem, the sum of the squares of the legs (which are 4R and 3R in this case) is equal to the square of the hypotenuse (which is the slant height). According to the Pythagorean Theorem, we can write the following equation:
Let's go back to the formula for the lateral surface area (LA).
To find the total surface area (TA), we must add the lateral area and the area of the base.
The problem requires us to find the ratio of the total surface area to the area of the base. This means we must find the following ratio:
We can cancel , which leaves us with 36/16.
Simplifying 36/16 gives 9/4.
The answer is 9/4.
Example Question #11 : Solid Geometry
What is the surface area of a cone with a radius of 6 in and a height of 8 in?
36π in2
96π in2
112π in2
66π in2
60π in2
96π in2
Find the slant height of the cone using the Pythagorean theorem: r2 + h2 = s2 resulting in 62 + 82 = s2 leading to s2 = 100 or s = 10 in
SA = πrs + πr2 = π(6)(10) + π(6)2 = 60π + 36π = 96π in2
60π in2 is the area of the cone without the base.
36π in2 is the area of the base only.
Example Question #1 : Cones
Use the following formula to answer the question.
The slant height of a right circular cone is . The radius is , and the height is . Determine the surface area of the cone.
Notice that the height of the cone is not needed to answer this question and is simply extraneous information. We are told that the radius is , and the slant height is .
First plug these numbers into the equation provided.
Then simplify by combining like terms.
Example Question #11 : Surface Area
The slant height of a cone is ; the diameter of its base is one-fifth its slant height. Give the surface area of the cone in terms of .
The formula for the surface area of a cone with base of radius and slant height is
.
The diameter of the base is ; the radius is half this, so
Substitute in the surface area formula: