Answer:
a) QR = 50
b) RZ = 41
c) XS = 40
d) ZS = 41
e) WZ = 4√(66) = 32.5 (nearest tenth)
Explanation:
A circumcenter of a triangle is:
- The center of a circle that passes through each vertex of a triangle.
- The point at which the perpendicular bisectors of the sides of the triangle intersect.
A perpendicular bisector is a line that divides another line segment into two equal parts at a right angle.
Given Z is the circumcenter of ΔQRS.
- ZW is the perpendicular bisector of QR, so QW = WR.
- ZX is the perpendicular bisector of RS, so RX = XS.
- ZY is the perpendicular bisector of QS, so QY = YS.
Part (a)
As ZW is the perpendicular bisector of QR and QW = 25, then:
Part (b)
As ZX is the perpendicular bisector of RS, and RS = 80, then RX = 40.
Therefore, triangle RXZ is a right triangle with legs RX = 40 and ZX = 9.
To calculate RZ, use Pythagoras Theorem:
⇒ RX² + ZX² = RZ²
⇒ 40² + 9² = RZ²
⇒ 1681 = RZ²
⇒ RZ = √(1681)
⇒ RZ = 41
Part (c)
As ZX is the perpendicular bisector of RS, XS is half the length of RS.
Therefore:
Part (d)
As ZX is the perpendicular bisector of RS, ΔRZS is an isoceles triangle with base RS and where RZ = ZS.
Therefore:
Part (e)
As Z is the circumcenter ΔQRS, Z is the center of a circle that passes through the vertices Q, R and S. Therefore, ZQ, ZR and ZS are the radii of the circle, and so ZQ = ZR = ZS.
As ZW is the perpendicular bisector of QR, triangle QZW is a right triangle with leg QW = 25 and hypotenuse ZQ = 41.
To calculate WZ, use Pythagoras Theorem:
⇒ WZ² + QW² = ZQ²
⇒ WZ² + 25² = 41²
⇒ WZ² = 41² - 25²
⇒ WZ² = 1056
⇒ WZ = √(1056)
⇒ WZ = 4√(66)
⇒ WZ = 32.5 (nearest tenth)