1 Answer

Shashi Shankar · Answer 1 · 2023-02-10T23:15:00+0000

5)

For the figure, lines AB and CD are crossed by a transversal line FE.

If lines AB || CD, then the angles, ∠BHK, and ∠HKD are supplementary angles, which means they add up to 180º.

So we can say that:

$\angle\text{BHK+}\angle\text{HKD}=180º$

We know that

∠BHK= (2x+50)º

∠HKD= (3x)º

Replace both measures in the expression above and you can determine an equation with "x" as the only unknown

Order the like terms together and simplify

$\begin{gathered} 2x+3x+20=180 \\ 5x+20=180 \end{gathered}$

Now you can determine the value of x. First, pass 50 to the other side of the equal sign by applying the opposite operation to both sides of it:

$\begin{gathered} 5x+50-20=180-50 \\ 5x=130 \end{gathered}$

Second, divide both sides of the expression by 5 to reach the value of x:

$\begin{gathered} (5x)/(5)=(130)/(5) \\ x=26 \end{gathered}$

Once determined the value of x, you can calculate the measures of the angles ∠BHK and ∠HKD

6)

$\begin{gathered} \angle BHK=2x+50 \\ \angle BHK=2\cdot26+50 \\ \angle BHK=52+50 \\ \angle BHK=102º \end{gathered}$

7)

$\begin{gathered} \angle HKD=3x \\ \angle HKD=3\cdot26 \\ \angle HKD=78º \end{gathered}$

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