Q. What is the value of cos(2x) if sin x = 1/2?
Solution
Using the double angle formula cos(2x) = 1 - 2sin^2 x. Since sin x = 1/2, we have cos(2x) = 1 - 2*(1/2)^2 = 1 - 2*(1/4) = 1 - 1/2 = 1/2.
Correct Answer: A — 1/2
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Q. What is the value of cos(2θ) if sin θ = 1/2?
Solution
Using the double angle formula cos(2θ) = 1 - 2sin^2 θ. Here, sin θ = 1/2, so cos(2θ) = 1 - 2(1/2)^2 = 1 - 2(1/4) = 1 - 1/2 = 1/2.
Correct Answer: C — -1/2
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Q. What is the value of cos(90°)?
-
A.
0
-
B.
1
-
C.
-1
-
D.
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Q. What is the value of cos(π/3)?
Solution
cos(π/3) = 1/2.
Correct Answer: B — 1/2
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Q. What is the value of cos^(-1)(-1)?
Solution
cos^(-1)(-1) = π, since cos(π) = -1.
Correct Answer: B — π
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Q. What is the value of cos^(-1)(0)?
Solution
cos^(-1)(0) corresponds to the angle where the cosine value is 0, which is π.
Correct Answer: C — π
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Q. What is the value of cot(cos^(-1)(1/2))?
Solution
cot(cos^(-1)(1/2)) = √3
Correct Answer: A — √3
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Q. What is the value of f(2) if f(x) = x^2 - 2x + 1?
Solution
f(2) = 2^2 - 2(2) + 1 = 4 - 4 + 1 = 1.
Correct Answer: A — 1
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Q. What is the value of i^4?
Solution
i^4 = (i^2)^2 = (-1)^2 = 1.
Correct Answer: A — 1
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Q. What is the value of k for which the equation x^2 + kx + 16 = 0 has equal roots?
Solution
For equal roots, the discriminant must be zero: k^2 - 4*1*16 = 0, thus k^2 = 64, giving k = -8 or 8. The answer is -4.
Correct Answer: B — -4
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Q. What is the value of k for which the equation x^2 + kx + 9 = 0 has no real roots?
-
A.
k < 6
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B.
k > 6
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C.
k = 6
-
D.
k <= 6
Solution
The discriminant must be negative: k^2 - 4*1*9 < 0 => k^2 < 36 => |k| < 6, hence k > 6.
Correct Answer: B — k > 6
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Q. What is the value of k for which the function f(x) = { kx + 2, x < 2; x^2 - 4, x >= 2 is continuous at x = 2?
Solution
Setting 2k + 2 = 0 gives k = 2.
Correct Answer: C — 2
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Q. What is the value of k for which the function f(x) = { kx, x < 0; x^2 + 1, x >= 0 is continuous at x = 0?
Solution
Setting k(0) = 0^2 + 1 gives k = 1.
Correct Answer: B — 0
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Q. What is the value of k for which the function f(x) = { kx, x < 2; x^2, x >= 2 } is continuous at x = 2?
Solution
Setting k(2) = 2^2 gives 2k = 4, thus k = 2.
Correct Answer: C — 4
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Q. What is the value of k if f(x) = kx^2 + 2x + 1 has a minimum value of -3?
Solution
The minimum value occurs at x = -b/(2a) = -2/(2k). Setting f(-1) = -3 gives k = -2.
Correct Answer: B — -2
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Q. What is the value of k if the equation x^2 + kx + 16 = 0 has no real roots?
Solution
For no real roots, the discriminant must be less than zero: k^2 - 4*1*16 < 0 => k^2 < 64 => |k| < 8.
Correct Answer: B — -4
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Q. What is the value of k if the quadratic equation x^2 + kx + 16 = 0 has equal roots?
Solution
For equal roots, the discriminant must be zero: k^2 - 4*1*16 = 0, thus k^2 = 64, giving k = -8 or k = 8. The answer is -8.
Correct Answer: B — -4
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Q. What is the value of k if the quadratic equation x^2 + kx + 16 = 0 has no real roots?
Solution
The discriminant must be less than zero: k^2 - 4*1*16 < 0 => k^2 < 64 => k < 8 and k > -8.
Correct Answer: B — -4
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Q. What is the value of k if the quadratic equation x^2 + kx + 25 = 0 has one real root?
Solution
For one real root, the discriminant must be zero: k^2 - 4*1*25 = 0, thus k^2 = 100, giving k = -10 or k = 10.
Correct Answer: A — -10
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Q. What is the value of k if the quadratic equation x^2 + kx + 9 = 0 has no real roots?
-
A.
k < 6
-
B.
k > 6
-
C.
k = 6
-
D.
k < 0
Solution
For no real roots, the discriminant must be less than zero: k^2 - 4*1*9 < 0, thus k > 6.
Correct Answer: B — k > 6
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Q. What is the value of k if the quadratic equation x^2 + kx + 9 = 0 has one real root?
Solution
For one real root, the discriminant must be zero: k^2 - 4*1*9 = 0 => k^2 = 36 => k = ±6.
Correct Answer: B — -3
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Q. What is the value of log_10(1000) + log_10(0.01)?
Solution
log_10(1000) = 3 and log_10(0.01) = -2, thus 3 - 2 = 1.
Correct Answer: C — -1
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Q. What is the value of log_10(1000)?
Solution
log_10(1000) = log_10(10^3) = 3.
Correct Answer: C — 3
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Q. What is the value of log_2(32) - log_2(4)?
Solution
log_2(32) = 5 and log_2(4) = 2. Therefore, 5 - 2 = 3.
Correct Answer: C — 3
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Q. What is the value of log_2(32) - log_2(8)?
Solution
log_2(32) = 5 and log_2(8) = 3. Therefore, 5 - 3 = 2.
Correct Answer: C — 3
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Q. What is the value of log_3(27) - log_3(9)?
Solution
log_3(27) = 3 and log_3(9) = 2. Therefore, 3 - 2 = 1.
Correct Answer: B — 1
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Q. What is the value of log_3(81)?
Solution
log_3(81) = log_3(3^4) = 4.
Correct Answer: C — 4
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Q. What is the value of log_4(64)?
Solution
log_4(64) = log_4(4^3) = 3.
Correct Answer: D — 5
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Q. What is the value of log_5(125)?
Solution
log_5(125) = log_5(5^3) = 3.
Correct Answer: B — 3
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Q. What is the value of log_5(25) - log_5(5)?
Solution
log_5(25) = 2 and log_5(5) = 1. Therefore, 2 - 1 = 1.
Correct Answer: A — 1
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