How to find a triangle on a coordinate plane - ISEE Lower Level Quantitative Reasoning
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Find the area of the above triangle--given that it has a base of
and a height of
.
Find the area of the above triangle--given that it has a base of and a height of
.
To find the area of the right triangle apply the formula: 
Thus, the solution is:

To find the area of the right triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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





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:
Compare your answer with the correct one above

The above triangle has a base of
and a height of
. Find the area.
The above triangle has a base of and a height of
. Find the area.
To find the area of this right triangle apply the formula: 
Thus, the solution is:

To find the area of this right triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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




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:
Compare your answer with the correct one above

The triangle shown above has a base of
and height of
. Find the area of the triangle.
The triangle shown above has a base of and height of
. Find the area of the triangle.
To find the area of this triangle apply the formula: 
Thus, the solution is:

To find the area of this triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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




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:
Compare your answer with the correct one above

At which of the following coordinate points does this triangle intersect with the
-axis?
At which of the following coordinate points does this triangle intersect with the -axis?
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.
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.
Compare your answer with the correct one above

The triangle shown above has a base of
and height of
. Find the perimeter of the triangle.
The triangle shown above has a base of and height of
. Find the perimeter of the triangle.
The perimeter of this triangle can be found using the formula: 
Thus, the solution is:



The perimeter of this triangle can be found using the formula:
Thus, the solution is:
Compare your answer with the correct one above

The above triangle has a height of
and a base with length
. Find the area of the triangle.
The above triangle has a height of and a base with length
. Find the area of the triangle.
In order to find the area of this triangle apply the formula: 
In order to find the area of this triangle apply the formula:
Compare your answer with the correct one above

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




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:
Compare your answer with the correct one above

The above triangle has a height of
and a base with length
. Find the perimeter of the triangle.
The above triangle has a height of and a base with length
. Find the perimeter of the triangle.
The perimeter of this triangle can be found using the formula: 
Thus, the solution is:




The perimeter of this triangle can be found using the formula:
Thus, the solution is:
Compare your answer with the correct one above

The triangle shown above has a base of length
and a height of
. Find the area of the triangle.
The triangle shown above has a base of length and a height of
. Find the area of the triangle.
To find the area of this triangle apply the formula: 
Thus, the solution is:

To find the area of this triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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




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:
Compare your answer with the correct one above
Which of the following sets of points would form a triangle if plotted on a coordinate plane?
Which of the following sets of points would form a triangle if plotted on a coordinate plane?
A triangle consist of three points. The correct answer is the only set that contains three points.
A triangle consist of three points. The correct answer is the only set that contains three points.
Compare your answer with the correct one above
A coordinate plane is shown.

Ralph plotted the following points on the coordinate grid:
Point X (7, 0); Point Y (7, 5); Point Z (0, 5)
A polygon is formed with vertices X, Y, and Z. Which type of polygon is formed?
A coordinate plane is shown.
Ralph plotted the following points on the coordinate grid:
Point X (7, 0); Point Y (7, 5); Point Z (0, 5)
A polygon is formed with vertices X, Y, and Z. Which type of polygon is formed?
Start by graphing and connecting the vertices.

The created figure has 3 sides and 3 angles. The only answer choice that has these characteristics is the triangle.
Start by graphing and connecting the vertices.
The created figure has 3 sides and 3 angles. The only answer choice that has these characteristics is the triangle.
Compare your answer with the correct one above
A coordinate plane is shown.

Ralph plotted the following points on the coordinate grid:
Point X (8, 8); Point Y (1, 4); Point Z (6, 5)
A polygon is formed with vertices X, Y, and Z. Which type of polygon is formed?
A coordinate plane is shown.
Ralph plotted the following points on the coordinate grid:
Point X (8, 8); Point Y (1, 4); Point Z (6, 5)
A polygon is formed with vertices X, Y, and Z. Which type of polygon is formed?
Start by plotting and connecting the ordered pairs.

The created figure has 3 sides and 3 angles. The only answer choice that has these characteristics is the triangle.
Start by plotting and connecting the ordered pairs.
The created figure has 3 sides and 3 angles. The only answer choice that has these characteristics is the triangle.
Compare your answer with the correct one above

Find the area of the above triangle--given that it has a base of
and a height of
.
Find the area of the above triangle--given that it has a base of and a height of
.
To find the area of the right triangle apply the formula: 
Thus, the solution is:

To find the area of the right triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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





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:
Compare your answer with the correct one above

The above triangle has a base of
and a height of
. Find the area.
The above triangle has a base of and a height of
. Find the area.
To find the area of this right triangle apply the formula: 
Thus, the solution is:

To find the area of this right triangle apply the formula:
Thus, the solution is:
Compare your answer with the correct one above

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




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:
Compare your answer with the correct one above