Trigonometric Equations MCQs set 2 for NTS NAT-ICS (Computer Science Track) Mathematics — 20 solved questions.
Q1. If tan(x) = 1, then x =
Answer: π/4 + nπ
Explanation: The tangent function equals 1 at π/4 and has a period of π, so the general solution is π/4 + nπ.
Q2. The solution of cos(x) = 0 is
Answer: (2n + 1)π/2
Explanation: The cosine function equals zero at odd multiples of π/2, hence the general solution is (2n + 1)π/2.
Q3. The general solution of 2sin(x) + √3 = 0 is
Answer: nπ + (-1)^(n+1) * π/3
Explanation: First, isolate sin(x) to get sin(x) = -√3/2, then use the general solution for sin(x) = sin(α).
Q4. The general solution of the equation sin(2x) = 1/2 is
Answer: nπ/2 + (-1)^n * π/12
Explanation: Use the identity sin(2x) = sin(α), then 2x = nπ + (-1)^n * α, and solve for x.
Q5. The general solution of tan(2x) = √3 is
Answer: nπ/2 + π/3
Explanation: First, find the principal solution, then use the periodicity of the tangent function to find the general solution.
Q6. The general solution of cos(3x) = 1/2 is
Answer: 2nπ/3 ± 2π/9
Explanation: First, isolate cos(3x), then use the general solution for cos(x) = cos(α).
Q7. The general solution of 3tan²(x) - 1 = 0 is
Answer: nπ ± arctan(1/√3)
Explanation: First, solve for tan(x), then use the general solution for tan(x) = tan(α).
Q8. The solution of 2sin(x)cos(x) = 1 is
Answer: nπ/2 + (-1)^n * π/4
Explanation: Use the identity sin(2x) = 2sin(x)cos(x), then simplify and solve.
Q9. The general solution of sin(x) + sin(3x) = 0 is
Answer: nπ or nπ ± π/4
Explanation: Use sum-to-product identity, then simplify and solve the resulting equation.
Q10. The general solution of cos(x) = cos(2x) is
Answer: nπ or 2nπ ± 2π/3
Explanation: Use the identity cos(2x) = 2cos²(x) - 1, then simplify and solve the resulting quadratic equation.
Q11. If sin(3x) = sin(x), then x =
Answer: nπ
Explanation: Use the identity sin(3x) - sin(x) = 0, then apply sum-to-product identity and solve.
Q12. The general solution of tan(x) = tan(2x) is
Answer: nπ
Explanation: First, simplify the equation to tan(2x) - tan(x) = 0, then use the identity for tan(A) - tan(B).
Q13. The general solution of 2sin²(x) + sin(x) = 0 is
Answer: nπ
Explanation: Factor out sin(x), then solve for sin(x) = 0 or sin(x) = -1/2.
Q14. The solution of cos(2x) + cos(x) = 0 is
Answer: nπ or 2nπ ± 2π/3
Explanation: Use the identity cos(2x) = 2cos²(x) - 1, then simplify and solve the resulting quadratic equation.
Q15. The general solution of sin(2x) = cos(x) is
Answer: nπ/2 + π/6 or nπ - π/2
Explanation: Use the identity sin(2x) = 2sin(x)cos(x) and cos(x) = cos(x), then simplify and solve.
Q16. If tan(x) = √3, then x =
Answer: nπ + π/3
Explanation: The tangent function has a period of π, and tan(π/3) = √3, hence the general solution is nπ + π/3.
Q17. The general solution of sin(2x) = 1 is
Answer: nπ/2 + (-1)^n * π/4
Explanation: For sin(2x) = 1, 2x = nπ + (-1)^n * π/2, hence x = nπ/2 + (-1)^n * π/4.
Q18. The solution of 2cos²(x) - 1 = 0 is
Answer: nπ ± π/4
Explanation: 2cos²(x) - 1 = cos(2x) = 0, hence 2x = (2n+1)π/2, giving x = nπ ± π/4.
Q19. The general solution of tan(3x) = 1 is
Answer: nπ/3 + π/12
Explanation: For tan(3x) = 1, 3x = nπ + π/4, hence x = nπ/3 + π/12.
Q20. If sin(x) + cos(x) = √2, then x =
Answer: 2nπ + π/4
Explanation: Dividing by √2 gives sin(x+π/4) = 1, hence x+π/4 = 2nπ + π/2, so x = 2nπ + π/4.