Express the area of the triangle ABC in terms of X. 2X 2X 2X A A A B B B C C C D D D 8 X+1

$$ \frac{X+9}{2}\sqrt{3X^2-2X-1} $$

$$ \frac{X+9}{2}\sqrt{5X^2+2X+1} $$

$$ \frac{X+9}{2}\sqrt{3X^2-2X-1} $$

Area of a Triangle: Using variables

Examples with solutions for Area of a Triangle: Using variables

Exercise #1

Given the rectangle ABCD

Given BC=X and the side AB is larger by 4 cm than the side BC.

The area of the triangle ABC is 8X cm².

What is the area of the rectangle?

Video Solution

Step-by-Step Solution

Let's calculate the area of triangle ABC:

$8x=\frac{(x+4)x}{2}$

Multiply by 2:

$16x=(x+4)x$

Divide by x:

$16=x+4$

Let's move 4 to the left side and change the sign accordingly:

$16-4=x$

$12=x$

Now let's calculate the area of the rectangle, multiply the length and width where BC equals 12 and AB equals 16:

$16\times12=192$

Answer

192

Exercise #2

The area of the triangle is 16.

Calculate X.

Video Solution

Answer

Exercise #3

The area of the triangle is 9.

Calculate X.

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Answer

Exercise #4

The area of the triangle below is equal to 21.

Calculate X.

Video Solution

Answer

Exercise #5

Since the area of the triangle is equal to 15.

Find X.

Area of a Triangle: Using variables

Examples with solutions for Area of a Triangle: Using variables

Exercise #1

Video Solution

Step-by-Step Solution

Answer

Exercise #2

Video Solution

Answer

Exercise #3

Video Solution

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Exercise #4

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Exercise #5

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Exercise #6

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Exercise #7

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Exercise #8

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Exercise #9

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Exercise #10

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Exercise #11

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Exercise #12

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