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Chapter 2: Q. 12 (page 197)

Given that f,g,h are functions with values f(2)=1, g(2)=-4, h(2)=3 and point -derivatives f'(2)=3, g'(2)=0, h'(2)=-1 Calculate
$(2 f + 3 g - h)' (2)$

Short Answer

Expert verified

Hence the value is $(2 f + 3 g - h)' (2) = 7$

Step by step solution

Given information

We are given that f,g,h are functions with values f(2)=1, g(2)=-4, h(2)=3 and point -derivatives f'(2)=3, g'(2)=0, h'(2)=-1

Compute the derivative

We are given $(2 f + 3 g - h)' (2)$

Which can be simplified as

$2 f' (2) + 3 g' (2) - h' (2) 2 (3) + 3 (0) + 1 6 + 1 = 7$

hence $(2 f + 3 g - h)' (2) = 7$

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Given that f,g,h are functions with values f(2)=1, g(2)=-4, h(2)=3 and point -derivatives f'(2)=3, g'(2)=0, h'(2)=-1 Calculate(2f+3g-h)'(2)

Short Answer

Step by step solution

Given information

Compute the derivative

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Given that f,g,h are functions with values f(2)=1, g(2)=-4, h(2)=3 and point -derivatives f'(2)=3, g'(2)=0, h'(2)=-1 Calculate
$(2 f + 3 g - h)' (2)$