Answer to: overrightarrow MO bisects angle angle LMN, m angle LMO = 6x - 20 and m angle NMO = 2x + 36. Solve for x and find m angle LMN. By signing

MO bisects ∠LMN, m∠LMO =8x 25, and m∠NMO =2x Solve for x and find 8x 25 = 2x + 41 6x=41+25=66 x=11 8 11 −25=63 =63 So the whole angle 28 14. Find the distance between points P(7, 3) and Q(2, 5) to the nearest tenth.

Solve for x and find m angle LMN. By signing 2010-10-30 · i'll assume m means angle (let's say < ) MO bisects < LMN to give angles: < LMO and < NMO. each of these angles are half of < LMN. now, < LMN = 6x - 24 Mo bisects lmn m lmn 6x-28 m lmo x+34. find m. Answers (1) One of the primary difference between prokaryotic cells and eukaryotic cells is. MO → bisects ∠LMN, m∠LMO =6x −22, and m∠NMO =2x +34.

Mo bisects lmn m lmn 6x-28

Find m NMO. A) 46.4 B) 92.8 C) 63 D) 58 Is the answer A? Math. Triangle LMN is similar to Triangle XYZ The scale factor of triangle LMN to Triangle XYZ is 2:5 what is the length of the zx . math indirect measurement Answer: 1 📌📌📌 question Plz with ! ray mo bisects ∠lmn, m∠lmo=6x-20 and m∠nmo=2x+36. solve for x and find m∠ lmn the diagram is not to scale. select one: a.

1.MO bisects LMN, m LMN=6x-28, m LMO=x+34. Find m NMO. A) 46.4 B) 92.8 C) 63 D) 58 Is the answer A? Mathematics . In triangle LMN, angle LNM = 114 degrees, LM = 123 mm and MN = 88mm. Calculate angle LMN, to the nearest degree. Math

Solve for x and find m∠LMN. The diagram is not to scale. A. x=9, m∠LMN=98 Algebra -> Angles-> SOLUTION: MO bisects

1 Answer Angle LMN=2LMO and NMO=LMO because LMN is bisected, So 6x-28=2x+68; 4x=96 and x=24, so NMO=x+34=24+34=58. answered Aug 30, 2015 by Rod Top Rated User (829k points)

In the figure (not drawn to scale), MO bisects ∠LMN, m LMO x∠ = −17 32, and m NMO x∠ = +144. Solve for x and find m LMN∠ .

Write an equation in slope-intercept form of the line through point P(10, 5) with slope 6x = 18 d. ____ x = 3 e. ____. 15. What are the names of the segments in the figure? 28.
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30. PROOF Use algebra to prove the Exterior Angle Sum Theorem. 31. m∠LMN = 72 Subtract 108 from each side.

1. 5x – 33 + 6x + 4 = 180. linear pair.
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M. 2x 3. 6x 5. 30. N. L. M. 3x. 5x. 15. 1-2. A. B. C x y. O x y. O. 3. Chapter 1 28. ZBFD is marked with a right angle symbol, so. mZBFD 90; ZBFD is a right angle. triangles. Use the Pythagorean Theorem to find. MO and NO. (MO)2.

Practice 2B 1.

Given: MO −→− bisects ∠LMN m∠LMO = 6x−20 m∠NMO = 2x+36 Solve for x and find m∠LMN. The diagram is not to scale. Question options: m∠LMN = 64 m∠LMN = 58 m∠LMN = 116 m∠LMN = 128 Question 15 5/5 Points How are the two angles related?

T(6, 17) is the midpoint of CD. The coordinates of. D are (6, 24). What are the MO. →. --- bisects ∠LMN, m∠LMO = 8x - 23, and m∠NMO = 2x + 3 Sep 6, 2017 Find an answer to your question mo bisects lmn m lmn 6x-28 m lmo x+34.

SURVEY. 60 seconds. Q. Find the value of x. answer choices. -5. 28. 19.