In δnop, p = 870 cm, mm∠n=127° and mm∠o=30°. find the length of n, to the nearest centimeter.
In Δnop, P = 870 Cm, Mm∠N=127° And Mm∠O=30°. Find The Length Of N, To The Nearest Centimeter.
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In Δnop, P = 870 Cm, Mm∠N=127° And Mm∠O=30°. Find The Length Of N, To The Nearest Centimeter.. Using a calculator, we can find that sin(127°) is approximately 0.9749 and sin(30°). N= angle n, n = length of side n, o = angle o, o = length of side o, p = angle p and p = length side p.
The length of n, to the. \[\frac{n}{\sin(m\angle n)} = \frac{p}{\sin(m\angle p)}\] given \(p = 870\) cm, substituting the known values:. N= angle n, n = length of side n, o = angle o, o = length of side o, p = angle p and p = length side p.
In Nop, P=870Cm, M∠ N=127° And M∠ O=30°.
Using the law of sines: • side p = 870 cm, • m ∠ n = 127 ° m\angle n = 127° m ∠ n = 127°, • m ∠ o = 30 ° m\angle o = 30° m ∠ o = 30°. Round to the nearest centimeter.
Using The Law Of Sines To Find The Length Of Side \(N\), We Have:
To find the length of side o in the triangle δnop, with given side n = 61 inches, mm∠n = 140°, and mm∠o = 31°, we first determine the measurement of angle p using the fact that the sum. Find the length of n, to the nearest centimeter. Unlock this solution for free previous.
We Have P = 870 Cm, M∠N = 127°, And M∠P = 23°.
N= angle n, n = length of side n, o = angle o, o = length of side o, p = angle p and p = length side p. Using a calculator, we can find that sin(127°) is approximately 0.9749 and sin(30°). Using the law of sines, we calculated that the length of side n in triangle δnop is approximately 1778 cm.
In Anop P 870 Cm M N 127 And M 0 30 Find The Length Of N To The Nearest Centimeter > Receive Answers To Your Questions.
This was determined by first finding angle p and then applying the. Calculate the value of n. \[\frac{n}{\sin(m\angle n)} = \frac{p}{\sin(m\angle p)}\] given \(p = 870\) cm, substituting the known values:.
Substituting The Given Values, We Have:
The length of n, to the. We are given triangle nop with:
