Question

please solve this question you get 90 point

Answer 1

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Here is your answer.

In the Given figure
/_ABC = 75°
/_BCF = y°
/_FCD = 25°
/_CFE = x°

/_ABC = /_BCD. ( Interior opposite angles)
/_ABC = /_BCF + /_FCD
$75 = y + 25 \\ y = 75 - 25 \\ y = 50$
Now
we extend CF to line G so that
/_GFE = /_FCD = 25° ( Crosponding angles)

Hence
/_GFE + /_CFE = 180° ( Straight point angle)
$25 + x = 180 \\ x = 180 - 25 \\ x = 155$
Therefore
Angle x = 155°
Angle y = 50°

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Answer 2

$\huge\boxed{\texttt{\fcolorbox{Red}{aqua}{Hey Mate!!}}}$
$<b><i><font face=Copper black size=4 color=red><marquee direction="up">$
Here is your answer.

In the Given figure
/_ABC = 75°
/_BCF = y°
/_FCD = 25°
/_CFE = x°

/_ABC = /_BCD. ( Interior opposite angles)
/_ABC = /_BCF + /_FCD
$75 = y + 25 \\ y = 75 - 25 \\ y = 50$
Now
we extend CF to line G so that
/_GFE = /_FCD = 25° ( Crosponding angles)

Hence
/_GFE + /_CFE = 180° ( Straight point angle)
$25 + x = 180 \\ x = 180 - 25 \\ x = 155$
Therefore
Angle x = 155°
Angle y = 50°

$\large{\red{\boxed{\boxed{\boxed{\boxed{\boxed{\boxed{\boxed{\boxed{\boxed{\boxed{\underline{\underline{\underline{Hope \: it \: helps\: you}}}}}}}}}}}}}}}$

$\huge\boxed{\texttt{\fcolorbox{Red}{yellow}{Be brainly!!}}}$

$<marquee>$
$\huge\bf\blue{\huge{\bf{\bf{@... MonarkSingh}}}}$