Let f: RvecR be differentiable and stric...

Let `f: RvecR` be differentiable and strictly increasing function throughout its domain. Statement 1: If `|f(x)|` is also strictly increasing function, then `f(x)=0` has no real roots. Statement 2: When `xvecooorvec-oo,f(x)vec0` , but cannot be equal to zero.

Statement I is true, Statement II is also true, Statement II is the correct explanation of statement I.

Statemetn I is true, Statement II is also true, Statement II is not correct explanation of Statement I

Statement I is true, Statement II is false

Statement I is false, Statement II is true

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