All Intermediate Geometry Resources
Example Questions
Example Question #77 : Triangles
A triangle is defined by the following points on a coordinate plane: .
What is the perimeter of the triangle?
In order to find the perimeter of the triangle, we will first need to find the length of each side of the triangle by using the distance formula.
Recall the distance formula for a line:
The first side of the triangle is the line segment made with as its endpoints.
The second side of the triangle is the line segment that has as its endpoints.
The third side of the triangle is the line segment that has as its endpoints.
Now, add up these three sides with a calculator to find the perimeter of the triangle.
Make sure to round to places after the decimal.
Example Question #78 : Triangles
A triangle is defined by the following points on a coordinate plane: .
What is the perimeter of the triangle?
In order to find the perimeter of the triangle, we will first need to find the length of each side of the triangle by using the distance formula.
Recall the distance formula for a line:
The first side of the triangle is the line segment made with as its endpoints.
The second side of the triangle is the line segment that has as its endpoints.
The third side of the triangle is the line segment that has as its endpoints.
Now, add up these three sides with a calculator to find the perimeter of the triangle.
Make sure to round to places after the decimal.
Example Question #81 : Triangles
A triangle is defined by the following points in a coordinate plane: .
What is the perimeter of the triangle?
In order to find the perimeter of the triangle, we will first need to find the length of each side of the triangle by using the distance formula.
Recall the distance formula for a line:
The first side of the triangle is the line segment made with as its endpoints.
The second side of the triangle is the line segment that has as its endpoints.
The third side of the triangle is the line segment that has as its endpoints.
Now, add up these three sides with a calculator to find the perimeter of the triangle.
Make sure to round to places after the decimal.
Example Question #1 : How To Find If Acute / Obtuse Triangles Are Congruent
Given: and .
True or false: It follows from the given information that .
True
False
False
Examine the diagram below.
, , and , but . As a result, it is not true that . Therefore, the statement is false.
Example Question #1 : How To Find If Acute / Obtuse Triangles Are Congruent
Given: and .
True or false: It follows from the information given that .
False
True
False
The congruence of corresponding angles of two triangles does not alone prove that the triangles are congruent. For example, see the figures below:
The three angle congruence statements are true, but the sides are not congruent, so the triangles are not congruent. The statement is false.
Example Question #3 : How To Find If Acute / Obtuse Triangles Are Congruent
Given: and .
True or false: It follows from the given information that .
False
True
True
As we are establishing whether or not , then , , and correspond respectively to , , and .
By the Side-Side-Side Congruence Postulate (SSS), if all three pairs of corresponding sides of two triangles are congruent, then the triangles themselves are congruent. Between and , and are corresponding sides, their congruence is given. The other two congruences between corresponding sides are given, so the conditions of SSS are satisfied. is indeed true.
Example Question #4 : How To Find If Acute / Obtuse Triangles Are Congruent
Given: and .
True or false: It follows from the given information that .
True
False
False
As we are establishing whether or not , then , , and correspond respectively to , , and .
By the Side-Side-Side Congruence Postulate (SSS), if all three pairs of corresponding sides of two triangles are congruent, then the triangles themselves are congruent. However, if we restate the first side congruence as
and examine it with the other two:
We see that while we can invoke SSS, the points correspond to , respectively. The triangle congruence that follows is therefore .
The answer is therefore false.
Example Question #4 : How To Find If Acute / Obtuse Triangles Are Congruent
Given: and .
True or false: It follows from the given information that .
False
True
True
As we are establishing whether or not , then , , and correspond respectively to , , and .
By the Side-Angle-Side Congruence Postulate (SAS), if two pairs of corresponding sides and the included angle of one triangle are congruent to the corresponding parts of a second, the triangles are congruent. and , indicating congruence between corresponding sides, and , indicating congruence between corresponding included angles. This satisfies the conditions of SAS, so is true.
Example Question #6 : How To Find If Acute / Obtuse Triangles Are Congruent
Refer to the above two triangles. By what statement does it follow that ?
The Hinge Theorem
The Angle-Angle-Side Theorem
The Angle-Side-Angle Postulate
The Converse of the Isosceles Triangle Theorem
The Converse of the Pythagorean Theorem
The Angle-Angle-Side Theorem
We are given that two angles of - and - and a nonincluded side are congruent to their corresponding parts, , , and of . It follows from the Angle-Angle-Side Theorem that .
Example Question #7 : How To Find If Acute / Obtuse Triangles Are Congruent
Refer to the above two triangles. By what statement does it follow that ?
The Hinge Theorem
The Triangle Midsegment Theorem
The Side-Angle-Side Postulate
The Isosceles Triangle Theorem
The Angle-Angle Postulate
The Side-Angle-Side Postulate
We are given that two sides of - sides and - and their included angle are congruent to their corresponding parts, sides and and of . It follows from the Side-Angle-Side Postulate that .