A right triangle has a base of and a height of . What is the area of the triangle?

Solution available with step-by-step explanation

SAT Area & Volume Question 25 | Free SAT Prep | Aniko

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Question 25·Easy·Area and Volume

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A right triangle has a base of $6\text{ cm}$ and a height of $3\text{ cm}$ . What is the area of the triangle?

For SAT geometry questions about the area of a right triangle, immediately write the formula $A = \tfrac{1}{2}bh$ and identify the base and height as the two sides forming the right angle. Substitute the given lengths, multiply them, and then take half—double-check you didn’t forget the $\tfrac{1}{2}$ , since that’s a very common trap on the test.

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Think about the area formula

What is the formula for the area of any triangle in terms of its base and height?

Use the right triangle’s legs

In a right triangle, the base and the height are the two sides that form the right angle. Which numbers in the problem are those sides?

Apply the formula carefully

Multiply the base and height together first, then remember to take one-half of that product.

Desmos Guide

Compute the triangle’s area

In Desmos, type 1/2 * 6 * 3 and look at the numerical result. That value is the area of the triangle in square centimeters.

Step-by-step Explanation

Recall the area formula for a triangle

For any triangle, including a right triangle, the area formula is:

A = \frac{1}{2} \cdot \text{base} \cdot \text{height}

In a right triangle, the base and height are the two sides that meet at the right angle.

Identify and substitute the base and height

From the problem:

Base $= 6\text{ cm}$
Height $= 3\text{ cm}$

Substitute these into the area formula:

A = \frac{1}{2} \cdot 6 \cdot 3

Calculate the area

First multiply the base and height:

6 \cdot 3 = 18

Now take half of 18:

A = \frac{1}{2} \cdot 18 = 9

So, the area of the triangle is $9\text{ cm}^2$ , which corresponds to choice D.

Strategy

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Desmos Guide

Step-by-step Explanation

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Strategy

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Desmos Guide

Step-by-step Explanation