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The bearing of two points x and y from z are 45° and 135° respectively . if |zx|=8cm and |zy|=6cm, find |xy|.



User Trunkc
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1 Answer

25 votes
25 votes

Answer:


|{\sf XY}| = 10\; {\rm cm}.

Explanation:

Refer to the diagram attached. The dashed segment attached to
\!{\sf Z} points to the north. Rotating this segment clockwise with point
{\sf Z}\!\! as the fixed center of rotation would eventually align this segment with the one between point
\!\!{\sf Z} and point
\!\!{\sf X}. The bearing of point
{\sf X} from point
{\sf Z} is the size of the angle between these two line segments when measured in the clockwise direction.

Subtract the bearing of
{\sf Y} from
{\sf Z} from the bearing of
{\sf X} from
{\sf Z} to find the measure of the angle
\angle {\sf YZX}:


\begin{aligned}\angle {\sf YZX} &= 135^(\circ) - 45^(\circ) \\ &= 90^(\circ)\end{aligned}.

Thus, triangle
\triangle {\sf YZX} is a right triangle (
90^(\circ)) with segment
{\sf YX} as the hypotenuse. It is given that
|{\sf XZ}| = 6\; {\rm cm} whereas
|{\sf ZY}| = 6\; {\rm cm}. Thus, by Pythagorean's Theorem:


\begin{aligned}|{\sf ZY}| &= \sqrt{|{\sf ZX}|^(2) + |{\sf ZY}|^(2)} \\ &= \sqrt{(8\; {\rm cm})^(2) + (6\; {\rm cm})^(2)} \\ &= 10\; {\rm cm}\end{aligned}.

The bearing of two points x and y from z are 45° and 135° respectively . if |zx|=8cm-example-1
User Altagrace
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