Question

( 0 / 2 )
( x ) (A) ( Fleft(0^{+}right)=F(0+h)=left(2_{0}^{1}, frac{1}{1+e^{1 / 4}}right) )
0
( =1 )
±0 ( quad therefore ) ino ( frac{1}{1+frac{1}{e^{1 / n}}} )
0
( frac{1}{1+frac{1}{m}}=frac{1}{1+0}=1 )
( d )
( frac{F(0+h)-F(0)}{h} )
( therefore 0 frac{1+e^{1 / n}-0}{4}=0 )
scorrect

# f(0) = 0, then 27 Let f(x)=-'1 for x #0 and Iter (A)f(0+) does not exist (C)f'(0*) is equal to 1 (B)f(0-) is equal to zero (D)f'(0*) is equal to zero [3011311624

Solution