MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
How do you solve right triangles?
Monday, September 30, 2019
Lesson 5.4
Day 53

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
Every right triangle has one right angle, two acute
angles, one hypotenuse, and two legs.
To SOLVE A RIGHT TRIANGLE
means to find
all 6 parts.

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
1.
Find the measure of the missing angle.
Round your answer to the nearest degree.

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
2.
Find the measure of the missing angle.
Round your answer to the nearest degree
.

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
3.
Find the missing side. Round your answer to the nearest tenth.

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.
4.
Find the missing side. Round your answer to the nearest tenth.

MM2G2
Students will define and apply sine, cosine, and tangent ratio to right triangles.
MM2G2b
Explain the relationship of the trigonometric ratios of complementary angles.
MM2G2c
Solve application problems using the trigonometric ratios.

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- Spring '18
- Eva Mira
- Trigonometry, Law Of Cosines, Right triangle, mT 70.3o