Given: BC⊥AC m∠BAC = 32° Use the given information to determine m∠CDE. 32° 58° 68° 90°

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Hashira · Answer 1 · 2020-06-10T06:59:36+0000

Answer:

Option B, 58°

Explanation:

In the given figure AB ║ CD and BC ║ DE ( given )

Since BC ║ DE and BC ⊥ AC

So DE will also be perpendicular to CE

m ∠ BAC = 32° [given]

Since AB ║ CD and line AE is transverse

Then ∠BAC ≅ ∠DCE ≅ 32°

Now in ΔDEC.

∠DCE + ∠CED + ∠EDC = 180°

32° + 90° + ∠EDC = 180°

122° + ∠EDC = 180°

∠EDC = 180 -122

= 58°

Option B, 58° is the answer.

Given: BC⊥AC m∠BAC = 32° Use the given information to determine m∠CDE. 32° 58° 68° 90°

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