Trigonometric Equations MCQs set 3 for NTS NAT-ICS (Computer Science Track) Mathematics — 20 solved questions.
Q1. The solution of sin(x) = sin(π/3) is
Answer: nπ + (-1)^n * π/3
Explanation: The general solution for sin(x) = sin(a) is x = nπ + (-1)^n * a, hence x = nπ + (-1)^n * π/3.
Q2. The general solution of cos(2x) = cos(π/4) is
Answer: nπ ± π/8
Explanation: For cos(2x) = cos(π/4), 2x = 2nπ ± π/4, hence x = nπ ± π/8.
Q3. If 2sin(x)cos(x) = 1, then x =
Answer: nπ/2 + (-1)^n * π/4
Explanation: 2sin(x)cos(x) = sin(2x) = 1, hence 2x = nπ + (-1)^n * π/2, so x = nπ/2 + (-1)^n * π/4.
Q4. The solution of sin(3x) + sin(x) = 0 is
Answer: nπ
Explanation: Using sum-to-product, 2sin(2x)cos(x) = 0, hence sin(2x) = 0 or cos(x) = 0, giving x = nπ/2 or (2n+1)π/2, simplifying to nπ.
Q5. The general solution of cos(x) + cos(3x) = 0 is
Answer: nπ/2 ± π/4
Explanation: Using sum-to-product, 2cos(2x)cos(x) = 0, hence cos(2x) = 0 or cos(x) = 0, giving x = nπ/2 ± π/4 or (2n+1)π/2.
Q6. The solution of 3tan²(x) - 1 = 0 is
Answer: nπ ± π/6
Explanation: tan²(x) = 1/3, hence tan(x) = ±1/√3, so x = nπ ± π/6.
Q7. If sin(2x) + sin(4x) = 0, then x =
Answer: nπ/3
Explanation: Using sum-to-product, 2sin(3x)cos(x) = 0, hence sin(3x) = 0, giving 3x = nπ, so x = nπ/3.
Q8. The solution of tan(x) + tan(2x) + tan(3x) = 0 is
Answer: nπ/3
Explanation: Using the tangent sum identity, the equation simplifies to tan(6x) = 0, hence 6x = nπ, so x = nπ/6, but upon detailed simplification, it results in nπ/3.
Q9. The general solution of 2sin(3x) + 1 = 0 is
Answer: nπ/3 + (-1)^(n+1) * π/18
Explanation: sin(3x) = -1/2, hence 3x = nπ + (-1)^(n+1) * π/6, so x = nπ/3 + (-1)^(n+1) * π/18.
Q10. The solution of cos(3x) = cos(2x) is
Answer: 2nπ or 2nπ/5
Explanation: For cos(3x) = cos(2x), 3x = 2nπ ± 2x, giving x = 2nπ or 2nπ/5.
Q11. Solve: sin(2x) = sin(x)
Answer: 2nπ or nπ + (-1)^n π/3
Explanation: Using the identity sin(a) = sin(b), we get 2x = nπ + (-1)^n x, simplifying to the given solutions.
Q12. The general solution of tan(2x) = cot(x) is
Answer: nπ/2 + π/6
Explanation: tan(2x) = 1/tan(x) gives tan(2x)tan(x) = 1, simplifying to 2x = nπ + π/2 - x, hence 3x = nπ + π/2.
Q13. If cos(2x) + 2cos(x) + 1 = 0, then x =
Answer: (2n + 1)π
Explanation: The equation simplifies to (cos(x) + 1)² = 0, so cos(x) = -1, giving x = (2n + 1)π.
Q14. The solution of 3tan²(x) = 1 is
Answer: nπ ± π/6
Explanation: tan²(x) = 1/3 gives tan(x) = ±1/√3, so x = nπ ± π/6.
Q15. If 2sin²(x) + sin²(2x) = 2, then x =
Answer: nπ ± π/4
Explanation: Simplifying gives 2sin²(x) + 4sin²(x)cos²(x) = 2, or 2sin²(x)(1 + 2cos²(x)) = 2, simplifying to sin²(x) = 1/2.
Q16. Solve: tan(x) + tan(2x) + tan(3x) = 0
Answer: nπ/3
Explanation: Using the tangent sum identity, we simplify to tan(3x)(1 - tan(x)tan(2x)) + tan(3x) = 0, giving tan(3x) = 0, hence x = nπ/3.
Q17. If sin(x) + cos(x) = 1, then x =
Answer: 2nπ or 2nπ + π/2
Explanation: Squaring both sides and simplifying gives sin(2x) = 0, so 2x = 2nπ or 2x = 2nπ + π, giving x = nπ or nπ + π/2, but checking gives 2nπ or 2nπ + π/2.
Q18. If tan(2x) = tan(x), then x =
Answer: nπ
Explanation: tan(2x) - tan(x) = 0 gives sin(x)/cos(2x) = 0, so sin(x) = 0, hence x = nπ.
Q19. If 2sin(x) + 1 = 0, then x = ?
Answer: Both A and B
Explanation: General solution for sin(x) = -1/2 is x = 7π/6 + 2kπ or 11π/6 + 2kπ, k ∈ Z.
Q20. Solve: tan(x) = √3
Answer: Both A and B
Explanation: tan(x) = √3 for x = π/3 + kπ, k ∈ Z, so x = π/3 or 4π/3.