Parallel Lines Cut by a Transversal - Solve for x, Line and Angle Relationships (Matching)

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x = 33, m∠8 = 150°

If m∠1 = (2x - 36)° and m∠3 = (3x - 69)°, What is m∠8?

x = 15, m∠1 = 38°

If m∠2 = (15x - 83)° and m∠7 = (2x + 8)°, What is m∠1?

x = 18, m∠6 = 27°

If m∠2 = (4x - 45)° and m∠8 = (2x - 9)°, What is m∠6?

x = 11, m∠6 = 96°

If m∠2 = (5x + 41)° and m∠7 = (11x - 37)°, What is m∠6?

x = 27, m∠1 = 96°

If m∠3 = (3x + 15)° and m∠8 = (5x - 51)°, What is m∠1?

x = 8, m∠8 = 115°

If m∠3 = (9x - 7)° and m∠1 = (x + 57)°, What is m∠8?

x = 18, m∠2 = 102°

If m∠5 = (7x - 48)° and m∠6 = (x + 84)°, What is m∠2?

x = 13, m∠8 = 87°

If m∠5 = (x + 80)° and m∠4 = (4x + 35)°, What is m∠8?

x = 33, m∠4 = 63°

If m∠6 = (3x - 36)° and m∠5 = (6x - 81)°, What is m∠4?

x = 13, m∠5 = 83°

If m∠6 = (4x + 45)° and m∠7 = (6x + 5)°, What is m∠5?

x = 5, m∠5 = 87°

If m∠6 = (9x + 48)° and m∠3 = (10x + 37)°, What is m∠5?

x = 10, m∠3 = 83°

If m∠7 = (18x - 97)° and m∠4 = (4x + 57)°, What is m∠3?

x = 47, m∠3 = 56°

If m∠7 = (x + 9)° and m∠1 = (3x - 85)°, What is m∠3?

x = 85, m∠1 = 27°

If m∠8 = (2x - 17)° and m∠4 = (x + 68)°, What is m∠1?

x = 12, m∠5 = 94°

If m∠8 = (4x + 38)° and m∠1 = (5x + 34)°, What is m∠5?

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