Final answer:
To find the measures of m(2WXZ) and m(ZZXY), we can find the measures of m(2WXZ) and m(ZZXY) by substituting the value of z into the respective expressions. For m(2WXZ), we substitute z = (5x+8) into the expression and get: substitute the value of z = (5x+8) into the respective expressions.
Step-by-step explanation:
Given that m(ZWXY) is equal to 160° and z = (5x+8), we can find the measures of m(2WXZ) and m(ZZXY) by substituting the value of z into the respective expressions. For m(2WXZ), we substitute z = (5x+8) into the expression and get:
m(2WXZ) = m(2W(5x+8)X) For m(ZZXY), we substitute z = (5x+8) into the expression and get: m(ZZXY) = m((5x+8)(5x+8)XY).
the measures of m(2WXZ) and m(ZZXY), we can find the measures of m(2WXZ) and m(ZZXY) by substituting the value of z into the respective expressions. For m(2WXZ), we substitute z = (5x+8) into the expression and get: substitute the value of z = (5x+8) into the respective expressions.