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43 votes
43 votes
Solve for the value of q.

Solve for the value of q.-example-1
User Marcslogic
by
2.9k points

2 Answers

18 votes
18 votes


\huge\text{Hey there!}



\huge\textsf{Guide to follow:}


\bullet\large\textsf{ A supplementary angles (}\angle\large\textsf{) is equal to 180}^\circ\\\bullet\large\textsf{ A complementary angles (}\angle\large\textsf{) is equal to 90}^\circ


\star \large\textsf{ The current angel that you are working with is a \boxed{\mathsf{supplementary \ angle \ (\angle)}}}}\\\large\textsf{so that means means \large\textsf{that your angle is equal to \boxed{\mathsf{180 ^\circ}}}}



\huge\textsf{What does your equation look like?}


\mathsf{(78) + (5q + 2) = 180}


\huge\textsf{How we solve for your equation?}

\mathsf{(78) + (5q + 2) = 180}

\mathsf{78 + 5q + 2 = 180}

\large\textsf{COMBINE the LIKE TERMS}

\mathsf{(78 + 2) + (5q) = 180}

\mathsf{78 + 2 + 5q = 180}

\mathsf{80 + 5q = 180}

\large\textsf{Simplifying}

\mathsf{5q + 80 = 180}

\large\textsf{SUBTRACT 80 to BOTH SIDES}

\mathsf{5q + 80 - 80 = 180 - 80}


\large\textsf{Simplify it:}


\mathsf{5q = 180 - 80}


\mathsf{5q = 100}


\large\textsf{DIVIDE 5 to BOTH SIDES}


\mathsf{(5q)/(5) = (100)/(5)}


\large\textsf{Simplify it:}


\mathsf{q = (100)/(5)}


\mathsf{q = 20}



\huge\textsf{So, what does mean your answer should be?}


\huge\text{Therefore, your answer should be: \boxed{\mathsf{q = 20}}}\huge\checkmark



\huge\text{Good luck on your assignment \& enjoy your day!}


~
\frak{Amphitrite1040:)}

User Anthony DeSimone
by
3.0k points
26 votes
26 votes

Answer:

q = 20

Explanation:

The two angles shown in the image are supplementary angles which means their sum is equal to 180°

We can find the value of q using the following equation:

78 + 5q + 2 = 180 add like terms

80 + 5q =180 subtract 80 from both sides

5q = 100 divide both sides by 5

q = 20

User Axelbrz
by
3.1k points