What Is The Sum Of The Measures Of The Exterior Angles Of The Polygon Shown Below? If Necessary, Round To The Nearest Tenth.

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What Is The Sum Of The Measures Of The Exterior Angles Of The Polygon Shown Below? If Necessary, Round To The Nearest Tenth.. Since the sum of the exterior angles is $$360^{\circ}$$ 36 0 ∘, and there is no need to round to the nearest tenth, the answer is $$360^{\circ}$$ 36 0 ∘ so, the sum of the measures of the. Thus the sum of the measures of the exterior angles of the polygon shown below is 360 degrees, no matter how many sides the polygon has.

Solved What is the sum of the measures of the exterior angles of the from www.gauthmath.com

Since the sum of the exterior angles is $$360^{\circ}$$ 36 0 ∘, and there is no need to round to the nearest tenth, the answer is $$360^{\circ}$$ 36 0 ∘ so, the sum of the measures of the. Thus the sum of the measures of the exterior angles of the polygon shown below is 360 degrees, no matter how many sides the polygon has.

Since The Sum Of The Exterior Angles Is $$360^{\Circ}$$ 36 0 ∘, And There Is No Need To Round To The Nearest Tenth, The Answer Is $$360^{\Circ}$$ 36 0 ∘ So, The Sum Of The Measures Of The.

Thus the sum of the measures of the exterior angles of the polygon shown below is 360 degrees, no matter how many sides the polygon has.

What is the sum of the measures of the exterior angles of the polygon shown below? if necessary, round to the nearest tenth.

What Is The Sum Of The Measures Of The Exterior Angles Of The Polygon Shown Below? If Necessary, Round To The Nearest Tenth.

Since The Sum Of The Exterior Angles Is $$360^{\Circ}$$ 36 0 ∘, And There Is No Need To Round To The Nearest Tenth, The Answer Is $$360^{\Circ}$$ 36 0 ∘ So, The Sum Of The Measures Of The.

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