Respuesta :

Answer:

The measure of ∠M is 58.2°

Step-by-step explanation:

Given ΔLMN, ∠N is a right angle, LM = 76 units, and MN = 40 units. we have to find the approximate measure of ∠M.

As, [tex]cos{\theta}=\frac{Base}{Hypotenuse}={B}{H}[/tex]

Here, [tex]cos∠M=\frac{40}{76}=\frac{10}{19}[/tex]

⇒ [tex]\angle M=cos^{-1}\frac{10}{19}=58.2431361407\sim58.2^{\circ}[/tex]

Hence, the measure of ∠M is 58.2°

Ver imagen SerenaBochenek

Answer:

58.2°

Step-by-step explanation:

First we find the measure of LN using the Pythagorean theorem.

LM is across from angle N, which makes it the hypotenuse.  This means that MN is a leg.  In the Pythagorean theorem, this gives us

a²+40²=76²

a²+1600 = 5776

Subtract 1600 from each side:

a²+1600-1600 = 5776-1600

a² = 4176

Take the square root of each side:

√(a²) = √(4176)

a = 64.622

We will now use the sine ratio to find the measure of angle M.  Sine is the ratio of the side opposite an angle to the hypotenuse; the side opposite M, LN, is 64.622, and the hypotenuse is 76:

sin M = 64.622/76

Taking the inverse sine of each side,

sin⁻¹(sin M) = sin⁻¹(64.622/76)

M = 58.24 ≈ 58.2°

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