Let f a,b R be continuous on a,b and differentiable on (a,b) (a) Prove that if f (')(x) 0 in (a,b) then f is injective (one to one) (b) Give an example of a function f R R that is one to one, and such that f (')(x (0)) 0 for some x (0)inR (c) Prove that if f (')(x) 0 in (a,b) , then f is strictly increasing in a,b (d) Prove that if f (')(x) in (a,b) , then f is strictly decreasing in a,b 1 Let f a,b R be continuous on a,b and differentiable on (a,b) (a) Prove that if f(x) 0 in (a,b) then f is injective (one to one) (b) Give an example of a function f RR that is one to one, and such that f(x0) 0 for some x0R (c) Prove that if f(x) 0 in (a,b), then f is strictly increasing in a,b (d) Prove that if f(x)

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Question: Let f:[a,b]->R be continuous on a,b and differentiable on (a,b) . (a). Prove that if f^(')(x)!=0 in (a,b) then f is injective (one-to-one). (b). Give

Let

f:[a,b]->R

be continuous on

a,b

and differentiable on

(a,b)

.\ (a). Prove that if

f^(')(x)!=0

(a,b)

then

f

is injective (one-to-one).\ (b). Give an example of a function

f:R->R

that is one-to-one, and such that

f^(')(x_(0))=0

for some

x_(0)inR

.\ (c). Prove that if

f^(')(x)>0

(a,b)

, then

f

is strictly increasing in

a,b

.\ (d). Prove that if

f^(')(x) in 
 (a,b), then 
 f is strictly decreasing in 
 a,b.

$Let f:[a,b]->R be continuous on a,b and differentiable on (a,b).\ (a).$

1. Let f:[a,b]R be continuous on [a,b] and differentiable on (a,b). (a). Prove that if f(x)=0 in (a,b) then f is injective (one-to-one). (b). Give an example of a function f:RR that is one-to-one, and such that f(x0)=0 for some x0R. (c). Prove that if f(x)>0 in (a,b), then f is strictly increasing in [a,b]. (d). Prove that if f(x)

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