question 4
not yet answered
marked out of 2.00
flag question
which statement about the angles in this diagram is false?
select one:
a.

Question

question 4
not yet answered
marked out of 2.00
flag question
which statement about the angles in this diagram is false?
select one:
 a. <f = <a
 b. <e = <f
 c. <d = <c
 d. <a = <b

Accepted Answer

# Explanation:
## Step1: Recall angle - relationship rules
When two parallel lines are cut by a transversal, vertical angles are equal, corresponding angles are equal, and alternate - interior angles are equal.
## Step2: Analyze option a
$\angle f$ and $\angle a$ are vertical angles. Vertical angles are always equal. So, $\angle f=\angle a$.
## Step3: Analyze option b
$\angle e$ and $\angle f$ are a linear - pair. A linear - pair of angles are supplementary ($\angle e+\angle f = 180^{\circ}$), not equal. So, the statement $\angle e=\angle f$ is false.
## Step4: Analyze option c
$\angle d$ and $\angle c$ are vertical angles. Vertical angles are equal, so $\angle d=\angle c$.
## Step5: Analyze option d
$\angle a$ and $\angle b$ are corresponding angles. Since the lines are parallel, corresponding angles are equal, so $\angle a=\angle b$.

# Answer:
B. $\angle e=\angle f$

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Step1: Recall angle - relationship rules

Step2: Analyze option a

Step3: Analyze option b

Step4: Analyze option c

Step5: Analyze option d

Answer: