2 Given that m <1 = (2x + 47)° and m 23 = (3x + 40)°, prove that m 21 = 61° by constructing a two-column proof. You must include a two-column proof with a column for statements and a column for reasons that justify your statements.

2 Given that m <1 = (2x + 47)° and m 23 = (3x + 40)°, prove that m 21 = 61° by constructing a two-column proof. You must include a two-column proof with a column for statements and a column for reasons that justify your statements.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.7: Distinguishable Permutations And Combinations

Problem 22E

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3
2
Given that m1 = (2x + 47)° and m 3 = (3x + 40)°, prove that m 21 = 61° by constructing a
two-column proof. You must include a two-column proof with a column for statements and a
column for reasons that justify your statements.

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