How to find a triangle on a coordinate plane - ISEE Lower Level Quantitative Reasoning

Card 0 of 13

Question

Find the area of the above triangle--given that it has a base of and a height of .

Answer

To find the area of the right triangle apply the formula: $A=\frac{base\times height}{2}$

Thus, the solution is:

$A=\frac{6\times 8}{2}=\frac{48}{2}=24$

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Question

Given that this triangle has a base of and a height of , what is the length of the longest side?

Answer

In order to find the length of the longest side of the triangle (hypotenuse), apply the formula:

, where and are equal to and , respectively. And, the hypotenuse.

Thus, the solution is:

$c=\sqrt{100}$

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Question

The above triangle has a base of and a height of . Find the area.

Answer

To find the area of this right triangle apply the formula: $A=\frac{base \times height}{2}$

Thus, the solution is:

$A=\frac{12\times 6}{2}=\frac{72}{2}=36$

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Question

The above triangle has a base of and a height of . Find the length longest side (the hypotenuse).

Answer

In order to find the length of the longest side of the triangle (hypotenuse), apply the formula:

, where and are equal to and , respectively. And, the hypotenuse.

Thus, the solution is:

$c=\sqrt{180}$

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Question

The triangle shown above has a base of and height of . Find the area of the triangle.

Answer

To find the area of this triangle apply the formula: $A=\frac{base\times height}{2}$

Thus, the solution is:

$A=\frac{13\times 8}{2}=\frac{104}{2}=52$

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Question

The triangle shown above has a base of and height of . Find the length of the longest side of the triangle (the hypotenuse).

Answer

In order to find the length of the longest side of the triangle (hypotenuse), apply the formula:

, where and are equal to and , respectively. And, the hypotenuse.

Thus, the solution is:

$c=\sqrt{233}$

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Question

At which of the following coordinate points does this triangle intersect with the -axis?

Answer

This triangle only intersects with the vertical -axis at one coordinate point: . Keep in mind that the represents the value of the coordinate and represents the value of the coordinate point.

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Question

The triangle shown above has a base of and height of . Find the perimeter of the triangle.

Answer

The perimeter of this triangle can be found using the formula: $P=height + base +\sqrt{height^2 +base^2}$

Thus, the solution is:

$P=13+8+\sqrt{8^2+13^2}$
$P=21 +\sqrt{64+169}$
$P=21+\sqrt{233}$

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Question

The above triangle has a height of and a base with length . Find the area of the triangle.

Answer

In order to find the area of this triangle apply the formula: $A=\frac{base \times height}{2}= \frac{4\times 3}{2}=\frac{12}{2}=6$

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Question

The above triangle has a height of and a base with length . Find the hypotenuse (the longest side).

Answer

In order to find the length of the longest side of the triangle (hypotenuse), apply the formula:

, where and are equal to and , respectively. And, the hypotenuse.

Thus, the solution is:

$c=\sqrt{25}=5$

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Question

The above triangle has a height of and a base with length . Find the perimeter of the triangle.

Answer

The perimeter of this triangle can be found using the formula: $P=height + base +\sqrt{height^2 +base^2}$

Thus, the solution is:

$P=3+4+\sqrt{3^2+4^2}$
$P=7+\sqrt{9+16}$
$P=7+\sqrt{25}$

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Question

The triangle shown above has a base of length and a height of . Find the area of the triangle.

Answer

To find the area of this triangle apply the formula: $A=\frac{base\times height}{2}$

Thus, the solution is:

$A=\frac{7\times 5}{2}=\frac{35}{2}=17.5$

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Question

The above triangle has a height of and a base with length . Find the hypotenuse (the longest side).

Answer

In order to find the length of the longest side of the triangle (hypotenuse), apply the formula:

, where and are equal to and , respectively. And, the hypotenuse.

Thus, the solution is:

$c=\sqrt{25}=5$

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