Indeterminate Forms and de L'hospital's Rule - Page 6
Questions
- I am facing problems in recognizing the Question in Calculus as given in description ?
- How do you solve #lim_x->pi/4 (tanx-cotx)/(x-pi/4)# ?
- What is #Lim_(x-> 0) (1+3x)^(1/(2x))# by using L'hopital/L'hospital rule?
- What is #lim_(x to pi) (sin3x)/(sin2x) #?
- What's the limit of Lim x -> -2 x^3 + 8/ x+2 ? Please help :(
- How do you solve the limit (e^(x)-1)/(sin (2x)) as x approaches 0?
- How do I solve this... L'Hopitals seems to go in an loop?
- These statements are true or false?Please justify your answer.(i)#lim_(x→0)(1/(x²)-1/(sin²x))# is in #(0/0)# form.(ii)Domain of #f(x,y)=(xy)/(x⁴+y⁴)# is #R²#.
- These statements are true or false?Please justify your answer.(i)The function #f(x,y)=(x³y+1,x²+y²)# is locally invertible at#(1,2)#.(ii)The function #f(x,y)=x³+y³# is integrable on #[1,2]×[1,3].#
- Check if the given function satisfies the three hypotheses of the Rolle’s Theorem. If Rolle’sTheorem applies, find all the values that satisfy the conclusion of Rolle’s Theorem. If it does not apply, state why?I hope the picture is clear and I need help
- Ap Calculus BC 2009 Question 6?
- theorem of l'hospital #lim x rarr +oo ((x^(-4/3))/(sin(1/x)))# ?
- What is the limits of : #LIM_(x->0) (e^(2x)-1)^(x^2)# ?
- How do you find the lim & definite integrals ? for :{lim as x approaches 0 (1/x^3) * integrals (t^2/t^4+1)dt} intervals{0,x}
- Lim of x^3 × e^(-x^2) as x approaches infinity?
- Lim x—> 0 (1-cos4x)/(1-cos5x) Answer The Value ?
- How to find the limit for #lim x -> 0 ( 1/(xsqrtx) * int_0^sqrtx cos(pi/2*e^(t^2))dt)# with l'Hospital?
- How to find the limit for #lim x -> 0 ( 1/(xsqrtx) * int_0^sqrtx cos(pi/2*e^(t^2))dt)# with l'Hospital?
- What is the limit of x to infinity of x^2-3/e^x?
- What is #\lim _ { x \rightarrow 0} x \ln x#?