parasmgandhi
contestada

In △ABC, m∠ABC=40°, BL (L∈ AC ) is the angle bisector of ∠B. Point M∈ AB so that LM ⊥ AB and N∈ BC so that LN ⊥ BC. Find the angles of △MNL.

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sqdancefan

A diagram helps.

∆BNL and ∆BML are congruent right triangles (given one angle and congruent hypotenuse BL). So, ∆MNL is isosceles, with angle L being 180° - 40° = 140°

Then angles M and N of that triangle are each 20°.

The angles M, N, L of ∆MNL are 20°, 20°, 140°.

Ver imagen sqdancefan
milanaalixzandar

Answer:

20° 20° 140°

Step-by-step explanation:

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