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VX is a perpendicular bisector of chord ZC. Find the length of the diameter VX.

VX is a perpendicular bisector of chord ZC. Find the length of the diameter VX.-example-1
User Dinkheller
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1 Answer

6 votes
6 votes

In this case, we can identify two similar triangles like this:

Since VX is a bisector of ZC it cuts ZC into two equal-length segments, then ZY and YC have the same length and we can formulate the following expression:

ZY = YC

ZY = 18

Since we are dealing with similar triangles, we can formulate the following expressions for VYZ and ZYX:


(VY)/(ZY)=(ZY)/(XY)

By replacing 18 for ZY and 27 for XY, we get:


(VY)/(18)=(18)/(27)

By multiplying both sides by 18, we can solve for 18, to get:


VY=(18)/(27)*18=12

By adding the length of VY to the length of XY, we get:

VY + XY = 12 + 27 = 39

Adding VY to XY we should get VX, which is the diameter of the circle. Then VX = 39

VX is a perpendicular bisector of chord ZC. Find the length of the diameter VX.-example-1
User Vipul J
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2.8k points