SOLUTION: Determine the measure of the interior angle at vertex A.
It is a pentagon, at vertex A is 3x This is how it is set up
4x
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-> SOLUTION: Determine the measure of the interior angle at vertex A.
It is a pentagon, at vertex A is 3x This is how it is set up
4x
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Question 202530: Determine the measure of the interior angle at vertex A.
It is a pentagon, at vertex A is 3x This is how it is set up
4x
4x 4x
3x 3x vertex A
Answers
A. 150 B. 50 C.90 D.30
The answer is 90 but can't figure out how they got it. Found 2 solutions by Earlsdon, solver91311:Answer by Earlsdon(6294) (Show Source):
You can put this solution on YOUR website! You can start with the formula for the sum (S) of the interior angles of a polygon with n sides: In this problem, you have a pentagon so n =5.
The sum of the interior angles can be expressed as: Add up the x's. Now set this equal to where n = 5 (for pentagon). Divide both sides by 18. so that...
The angle at vertex A is 3*x, so... =
The sum of the interior angles of any polygon is degrees where is the number of sides (or vertices, if you will) of the polygon. You have a pentagon so , hence the sum of the interior angles is
Your angles are given as , , , , and , so:
Just solve for and then multiply by 3 to get the measure of angle A, or by 4 to get the measure of any one of the larger angles.
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