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$the figure below, m/_2=63^(@). Find m/_1,m/_3, and m/_4. {:[m/_1=],[m/_3=],[m/_4=]:} ◻$

the figure below, $m \angle 2=63^{\circ}$ . Find $m \angle 1, m \angle 3$ , and $m \angle 4$ . $\newline$ $\begin{array}{l} m \angle 1= \\ m \angle 3= \\ m \angle 4= \end{array}$ $\newline$ $\square$

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Transformations of quadratic functions

Full solution

Q. the figure below,

m \angle 2=63^{\circ}

. Find

m \angle 1, m \angle 3

, and

m \angle 4

.

\newline

\begin{array}{l} m \angle 1= \\ m \angle 3= \\ m \angle 4= \end{array}

\newline

\square

Assume Consecutive Angles: Since no diagram is provided, we'll assume that angles $1$ , $2$ , $3$ , and $4$ form a set of consecutive angles around a point, which means they add up to $360$ degrees.
Calculate Sum: Calculate the sum of the other three angles by subtracting the measure of angle $2$ from $360$ degrees. $\newline$ $360^\circ - 63^\circ = 297^\circ$ .
Find Measure: Assuming angles $1$ , $3$ , and $4$ are equal (as no additional information is provided), divide $297$ degrees by $3$ to find the measure of each angle. $\newline$ $297$ degrees $/$ $3$ = $99$ degrees.

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