Question:

Match List-I with List-II
List-I List-II
(A) The minimum value of $ f(x) = (2x - 1)^2 + 3 $ (I) 4
(B) The maximum value of $ f(x) = -|x + 1| + 4 $ (II) 10
(C) The minimum value of $ f(x) = \sin(2x) + 6 $ (III) 3
(D) The maximum value of $ f(x) = -(x - 1)^2 + 10 $ (IV) 5

Choose the correct answer from the options given below:

List-I	List-II
(A) The minimum value of \( f(x) = (2x - 1)^2 + 3 \)	(I) 4
(B) The maximum value of \( f(x) = -\|x + 1\| + 4 \)	(II) 10
(C) The minimum value of \( f(x) = \sin(2x) + 6 \)	(III) 3
(D) The maximum value of \( f(x) = -(x - 1)^2 + 10 \)	(IV) 5

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To find the max/min of simple quadratic and absolute value functions, find the value that makes the squared or absolute part zero. For trigonometric functions, use their known range (e.g., [-1, 1] for sine and cosine).

Updated On: Sep 9, 2025

(A) - (I), (B) - (II), (C) - (III), (D) - (IV)
(A) - (III), (B) - (II), (C) - (I), (D) - (IV)
(A) - (III), (B) - (I), (C) - (IV), (D) - (II)
(A) - (III), (B) - (IV), (C) - (I), (D) - (II)

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The Correct Option is C

Solution and Explanation

Step 1: Understanding the Concept:
We need to find the minimum or maximum value for each function in List-I by analyzing their properties. This involves understanding the range of basic functions like squares, absolute values, and trigonometric functions.
Step 3: Detailed Explanation:

(A) f(x) = $(2x - 1)^2 + 3$: The term $(2x - 1)^2$ is a square, so its minimum value is 0. This occurs when $2x - 1 = 0$.
Therefore, the minimum value of the entire function is $0 + 3 = 3$. This matches with (III).

(B) f(x) = $-|x + 1| + 4$: (Assuming a typo in the OCR, which likely missed the negative sign before the absolute value).
The term $|x + 1|$ is always greater than or equal to 0. Its minimum value is 0.
Therefore, the term $-|x + 1|$ has a maximum value of 0.
The maximum value of the entire function is $0 + 4 = 4$. This matches with (I).

(C) f(x) = sin(2x) + 6: The range of the sine function, sin(2x), is [-1, 1].
The minimum value of sin(2x) is -1.
Therefore, the minimum value of the entire function is $-1 + 6 = 5$. This matches with (IV).

(D) f(x) = $-(x - 1)^2 + 10$: The term $(x - 1)^2$ has a minimum value of 0.
Therefore, the term $-(x - 1)^2$ has a maximum value of 0.
The maximum value of the entire function is $0 + 10 = 10$. This matches with (II).

Step 4: Final Answer:
The correct matching is (A) - (III), (B) - (I), (C) - (IV), (D) - (II). This corresponds to option (3).

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List-I	List-II
(A) The minimum value of \( f(x) = (2x - 1)^2 + 3 \)	(I) 4
(B) The maximum value of \( f(x) = -\|x + 1\| + 4 \)	(II) 10
(C) The minimum value of \( f(x) = \sin(2x) + 6 \)	(III) 3
(D) The maximum value of \( f(x) = -(x - 1)^2 + 10 \)	(IV) 5

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Show Hint

The Correct Option is C

Solution and Explanation

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