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GED Math : Angle Geometry

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Example Questions

Example Question #111 : Angle Geometry

Find the measure of angle B if it is the supplement to angle A:

$m\angle A=162^{o}$

Possible Answers:

$m\angle B=83^{o}$

$m\angle B=28^{o}$

$m\angle B=26^{o}$

$m\angle B=18^{o}$

Correct answer:

$m\angle B=18^{o}$

Explanation:

If two angles are supplementary, that means the sum of their degrees of measure will add up to 180. In order to find the measure of angle B, subtract angle A from 180 like shown:

$m\angle B=180^{o}-162^{o}=18^{o}$

This gives us a final answer of 18 degrees for angle B.

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Example Question #112 : Angle Geometry

Find the measure of angle B if it is the supplement to angle A:

$m\angle A=158^{o}$

Possible Answers:

$m\angle B=26^{o}$

$m\angle B=24^{o}$

$m\angle B=20^{o}$

$m\angle B=22^{o}$

Correct answer:

$m\angle B=22^{o}$

Explanation:

If two angles are supplementary, that means the sum of their degrees of measure will add up to 180. In order to find the measure of angle B, subtract angle A from 180 like shown:

$m\angle B=180^{o}-158^{o}=22^{o}$

This gives us a final answer of 22 degrees for angle B.

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Example Question #113 : Angle Geometry

Thingy

Refer to the above diagram.

Which of the following is a valid alternative name for $\overrightarrow{BD}$ ?

Possible Answers:

$\overrightarrow{DB}$

$\overrightarrow{BC}$

$\overrightarrow{BCD}$

$\overrightarrow{CB}$

Correct answer:

$\overrightarrow{BC}$

Explanation:

The name of a ray includes two letters, so $\overrightarrow{BCD}$ can be eliminated.

The first letter must be the endpoint. Since $\overrightarrow{BD}$ is a name of the ray, the endpoint is , and any alternative name for the ray must begin with . This leaves only $\overrightarrow{BC}$ .

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Example Question #114 : Angle Geometry

Thingy

Refer to the above diagram.

$\overleftrightarrow{AE} ||\overleftrightarrow{BD}$ ; $m \angle CED = 64^{\circ }$ ; $m \angle EFC = 107 ^{\circ }$ .

What is $m \angle FCE$ ?

Possible Answers:

$47^{\circ }$

$32^{\circ }$

$53^{\circ }$

$64^{\circ }$

Correct answer:

$47^{\circ }$

Explanation:

$\angle CED$ and $\angle ECD$ are two acute angles of a right triangle and are therefore complementary - that is,

$m \angle ECD + m \angle CED = 90^{\circ }$

$m \angle CED = 64^{\circ }$ , so

$m \angle ECD + 64^{\circ } = 90^{\circ }$

$m \angle ECD = 26^{\circ }$

$\angle ECD$ and $\angle FEC$ , being alternate interior angles formed by transversal $\overrightarrow{CE}$ across parallel lines, are congruent, so $m \angle FEC= 26^{\circ }$ .

We now look at $\Delta FEC$ , whose interior angles must have degree measures totaling $180^{\circ }$ , so

$m\angle FCE + m \angle FEC + m\angle EFC = 180^{\circ }$

$m\angle FCE + 26 ^{\circ }+107^{\circ } = 180^{\circ }$

$m\angle FCE + 133^{\circ } = 180^{\circ }$

$m\angle FCE= 47^{\circ }$

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Example Question #115 : Angle Geometry

Thingy

Refer to the above diagram.

Which of the following facts does not, by itself, prove that $\overleftrightarrow{AE} \parallel \overleftrightarrow{BD}$ ?

Possible Answers:

$\angle BCE$ and $\angle FEC$ are supplementary angles

$\angle AFC \cong \angle DCF$

$\angle FED$ is a right angle

$\overrightarrow{CE}$ bisects $\angle FCD$

Correct answer:

$\overrightarrow{CE}$ bisects $\angle FCD$

Explanation:

From the Parallel Postulate and its converse, as well as its various resulting theorems, two lines in a plane crossed by a transversal are parallel if any of the following happen:

Both lines are perpendicular to the same third line - this happens if $\angle FED$ is a right angle, since, from this fact and the fact that $\angle EDC$ is also right, both lines are perpendicular to $\overline{ED}$ .

Same-side interior angles are supplementary - this happens if $\angle BCE$ and $\angle FEC$ are supplementary, since they are same-side interior angles with respect to transversal $\overrightarrow{CE}$ .

Alternate interior angles are congruent - this happens if $\angle AFC \cong \angle DCF$ , since they are alternate interior angles with respect to transversal $\overleftrightarrow{FC}$ .

However, the fact that $\overrightarrow{CE}$ bisects $\angle FCD$ has no bearing on whether $\overleftrightarrow{AE} \parallel \overleftrightarrow{BD}$ is true or not, since it does not relate any two angles formed by a transversal.

" $\overrightarrow{CE}$ bisects $\angle FCD$ " is the correct choice.

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Example Question #4 : Opposite And Corresponding Angles

In two intersecting lines, the opposite angles are (2x-7) and (9x-14) . What must be the value of ?

Possible Answers:

$\frac{201}{11}$

$\frac{111}{11}$

Correct answer:

Explanation:

In an intersecting line, vertical angles are equal to each other.

Set up an equation such that both angles are equal.

2x-7 = 9x-14

Solve for . Subtract on both sides.

2x-7 -(2x)= 9x-14 -(2x)

-7 = 7x-14

Add 14 on both sides.

-7 +14= 7x-14+14

7= 7x

Divide by 7 on both sides.

$\frac{7}{7}= \frac{7x}{7}$

x=1

The answer is:

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Example Question #4 : Opposite And Corresponding Angles

Suppose a pair of opposite angles are measured 2x-3 and 6x-8 . What must the value of ?

Possible Answers:

$\frac{11}{4}$

$\frac{5}{8}$

$\frac{5}{4}$

$\frac{2}{3}$

$\frac{1}{2}$

Correct answer:

$\frac{5}{4}$

Explanation:

Vertical angles are equal.

Set both angles equal and solve for x.

2x-3 = 6x-8

Subtract on both sides.

2x-3 -2x= 6x-8-2x

-3 = 4x-8

Add 8 on both sides.

-3+8= 4x-8+8

5=4x

Divide by 4 on both sides.

$x=\frac{5}{4}$

The answer is: $\frac{5}{4}$

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Example Question #1 : Opposite And Corresponding Angles

Suppose two vertical angles in a pair of intersecting lines. What is the value of if one angle is 3x-3 and the other angle is ?

Possible Answers:

Correct answer:

Explanation:

Vertical angles of intersecting lines must equal to each other.

Set up an equation such that both angle measures are equal.

3x-3 = 33

Add three on both sides.

3x-3 +3= 33+3

3x =36

Divide by three on both sides.

$\frac{3x }{3}=\frac{36}{3}$

The answer is:

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Example Question #4 : Opposite And Corresponding Angles

Suppose two opposite angles are measured 5x-5 and . What is the value of ?

Possible Answers:

$\textup{The answer is not given.}$

Correct answer:

Explanation:

Opposite angles equal. Set up an equation such that both angle values are equal.

5x-5 =75

Add 5 on both sides.

5x-5 +5=75 +5

5x = 80

Divide by 5 on both sides.

$\frac{5x}{5} = \frac{80}{5}$

x=16

2x =32

The answer is:

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Example Question #4 : Opposite And Corresponding Angles

With a pair of intersecting lines, a set of opposite angles are measured 5x+1 and 10x-9 . What must the value of be?

Possible Answers:

$\frac{56}{5}$

Correct answer:

Explanation:

Opposite angles of two intersecting lines must equal to each other. Set up an equation such that both angle are equal.

5x+1= 10x-9

Add 9 on both sides.

5x+1+9= 10x-9+9

5x+10= 10x

Subtract on both sides.

5x+10-5x= 10x-5x

10 = 5x

x=2

This means that equals .

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GED Math : Angle Geometry

Study concepts, example questions & explanations for GED Math

All GED Math Resources

Example Questions

Example Question #111 : Angle Geometry

Example Question #112 : Angle Geometry

Example Question #113 : Angle Geometry

Example Question #114 : Angle Geometry

Example Question #115 : Angle Geometry

Example Question #4 : Opposite And Corresponding Angles

Example Question #4 : Opposite And Corresponding Angles

Example Question #1 : Opposite And Corresponding Angles

Example Question #4 : Opposite And Corresponding Angles

Example Question #4 : Opposite And Corresponding Angles

All GED Math Resources

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