What will be the domain of the function, if 3^x + 3^f(x) = minimum of Φ(t), where Φ(t) = minimum of (2t^3 – 15t^2 + 36t – 25, 2 + |sint|; 2 ≤ t ≤ 4} ?(a) (-∞, 1)(b) (-∞, loge3)(c) (0, loge2)(d) (-∞, loge2)I have been asked this question in a national level competition.This question is from Second Order Derivative topic in chapter Limits and Derivatives of Mathematics – Class 11

What will be the domain of the function, if 3^x + 3^f(x) = minimum of

1.	What will be the domain of the function, if 3^x + 3^f(x) = minimum of Φ(t), where Φ(t) = minimum of (2t^3 – 15t^2 + 36t – 25, 2 + \|sint\|; 2 ≤ t ≤ 4} ?(a) (-∞, 1)(b) (-∞, loge3)(c) (0, loge2)(d) (-∞, loge2)I have been asked this question in a national level competition.This question is from Second Order Derivative topic in chapter Limits and Derivatives of Mathematics – Class 11
Answer» The correct option is (d) (-∞, loge2) Easy explanation: LET, g(t) = 2t^3 – 15t^2 + 36t -25 g’(t) = 6t^2 – 30t + 36 = 0 => 6(t^2 – 5t + 6) = 0 => t = 2, 3 For, 2 ≤ t ≤ 4, at t = 3, g”(t) > 0 So, g(t) is minimum. g(t)min = g(3) = 227 – 159 + 36*3 – 25 = 2 Also, 2 + \|SINT\| ≥ 2 Hence, minimum Φ(t) = 2 Therefore, 3^x + 3^f(x) = 2 =>3^f(x) = 2 – 3^x Thus, 3^f(x) > 0 => 3^x > 0 and 3^x < 2 Therefore, x € (-∞, loge2)

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