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Unit 5 Review and Quiz

A free Trigonometry lesson from the “Trig Identities” unit, with a worked example and practice problems including step-by-step solutions.

This checkpoint reviews Trig Identities with a mix of computation, interpretation, and transfer problems.

What you'll learn

Why it matters: Identities keep physics, engineering, and calculus formulas flexible enough to simplify, compare, or solve.

Worked example

Problem. Unit 5 Review and Quiz: If sin(theta)=3/5 and theta is in Quadrant I, find cos(theta).

  1. Use sin^2 + cos^2 = 1.
  2. cos^2 = 16/25.
  3. Cosine is positive, so cos = 4/5.

Answer: 4/5

Practice problems

1. Unit 5 Review and Quiz: Rewrite tan(x) using sine and cosine.

Show solution
  1. Checkpoint Review: First identify exactly what the question is asking: Unit 5 Review and Quiz: Rewrite tan(x) using sine and cosine.
  2. Choose the operation or relationship that matches the wording, then carry it out one clear step at a time.
  3. Use the quotient identity.
  4. Tangent equals sine divided by cosine.
  5. tan(x) = sin(x)/cos(x).
  6. Check the result by substituting or estimating: the response should match sin(x)/cos(x) and make sense in the original problem.

Answer: sin(x)/cos(x)

2. Unit 5 Review and Quiz: Simplify 1 - sin^2(x).

Show solution
  1. Checkpoint Review: First identify exactly what the question is asking: Unit 5 Review and Quiz: Simplify 1 - sin^2(x).
  2. Choose the operation or relationship that matches the wording, then carry it out one clear step at a time.
  3. Use sin^2(x) + cos^2(x) = 1.
  4. Subtract sin^2(x).
  5. The result is cos^2(x).
  6. Check the result by substituting or estimating: the response should match cos^2(x) and make sense in the original problem.

Answer: cos^2(x)

3. Unit 5 Review and Quiz: Simplify tan(x)cos(x).

Show solution
  1. Checkpoint Review: First identify exactly what the question is asking: Unit 5 Review and Quiz: Simplify tan(x)cos(x).
  2. Choose the operation or relationship that matches the wording, then carry it out one clear step at a time.
  3. Replace tangent with sin(x)/cos(x).
  4. Cancel the cosine factor.
  5. The result is sin(x).
  6. Check the result by substituting or estimating: the response should match sin(x) and make sense in the original problem.

Answer: sin(x)

4. Unit 5 Review and Quiz: If sin(theta)=3/5 and theta is in Quadrant I, find cos(theta).

Show solution
  1. Checkpoint Review: First identify exactly what the question is asking: Unit 5 Review and Quiz: If sin(theta)=3/5 and theta is in Quadrant I, find cos(theta).
  2. For fractions, use equivalent forms, common denominators, or reciprocals depending on the operation being used.
  3. Use sin^2 + cos^2 = 1.
  4. cos^2 = 16/25.
  5. Cosine is positive, so cos = 4/5.
  6. Check the result by substituting or estimating: the response should match 4/5 and make sense in the original problem.

Answer: 4/5

5. Unit 5 Review and Quiz: Which identity is sin(a + b)?

Choices: sin(a)cos(b) + cos(a)sin(b) · cos(a)cos(b) - sin(a)sin(b) · tan(a) + tan(b) · sin(a)sin(b)

Show solution
  1. Checkpoint Review: First identify exactly what the question is asking: Unit 5 Review and Quiz: Which identity is sin(a + b)?
  2. Compare each answer choice with the calculation or rule, and eliminate choices that do not satisfy the condition.
  3. Use the sine sum identity.
  4. It combines sine-cosine products.
  5. The first choice is correct.
  6. Verify the selected choice by checking that it satisfies the original prompt and that the other choices fail the same test.

Answer: sin(a)cos(b) + cos(a)sin(b)

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