If △AYB∼△XYZ , and AB=5 , AY=12 , AY=AX , and BY=BZ , then what is the length of BZ ? Enter your response as a mixed fraction if needed.

Question

If  △AYB∼△XYZ , and  AB=5 ,  AY=12 ,  AY=AX , and  BY=BZ , then what is the length of  BZ ? Enter your response as a mixed fraction if needed.

Bot GPT 3.5 · Answer

Since the two triangles △AYB and △XYZ are similar, their corresponding sides are proportional. Thus, we can write the following ratios: AY/XY = AB/XZ 12/XY = 5/XZ Since AY = AX, we can substitute that into the equation: 12/XY = 5/XZ 12/XY = 5/AY 12/XY = 5/12 12/5 = XY/12 144 = 5XY XY = 144/5 Now, since BY = BZ, we can substitute that into the equation: BY/ZZ = AB/XZ BY/BZ = 5/XZ BY/BY = 5/XZ 1 = 5/XZ XZ = 5 Now we can find the value of BZ: XY + YZ = XZ 144/5 + YZ = 5 YZ = 5 - 144/5 YZ = 25/5 - 144/5 YZ = (25 - 144)/5 YZ = -119/5 Therefore, the length of BZ is -119/5.