Answers created by Wataru
 Back to user's profile

Next

What is the antiderivative of #tan(x)#?

How do you use the binomial series to expand #f(x)= 1/((1+x)^2)#?

How do you find the equation of the tangent line to the curve #y=x^2e^x# at (1, 1/e)?

Find the length of the parametric curve #x = e^t + e^t, y = 5  2t# from #t = 0 to t = 1#?

Question #91038

Question #1be07

Does #a_n=x^n/(xn!) # converge for any x?

Suppose #T_4(x) = 73(x2)+7(x2)^26(x2)^3+8(x2)^4# is the 4thdegree Taylor polynomial centered at #x=2# for some function f, what is the value of #f^((3))(2)#?

Question #f6339

Question #5f86e

How do you solve # 3+ b  \leq 3#?

How do you evaluate #\lim _ { x \rightarrow 0} \frac { \sin ^ { 3} 2x } { \sin ^ { 3} 3x }#?

If #k != 0#, what is # \lim _ { x \rightarrow k } \frac { x ^ { 2}  k ^ { 2} } { x ^ { 2}  k x } #?

How do you find the average rate of change of #h(x) = x^3 − 1/5e^x# from [0,1]?

Question #cc8ed

How do you derive the maclaurin series for #f(x)=ln(1+x)#?

How do you evaluate #\sum _ { n = 1} ^ { \infty } 8( \frac { 1} { 2} ) ^ { k  1}#?

Question #88d11

How do you use the squeeze theorem to show that #lim_(x to 0)x^4cos2x=0#?

How do you show that the series #1/32/5+3/74/9+...+((1)^(n1)n)/(2n+1)+...# diverges?

How do you evaluate #\int _ { \frac { 1} { 6} \pi } ^ { \frac { 1} { 3} \pi } 3\tan ^ { 2} x d x#?

Question #6aa72

How many subsets with three elements of #A={1,2,3,4,5,6}# containing element "1"?

Question #f9b8d

Question #1abd1

Question #b9e60

Could you please prove that #lim_(x rarr 0) sin(x)/x = 1# using the formal definition of limits?

Question #7f415

Question #3ade9

How do you simplify #sqrt12+sqrt27sqrt3#?

How do you simplify #\frac { z } { ( z  1) ^ { 2} }  \frac { 1} { ( z  1) ( z + 3) }#?

How do you factor: #y= 32x^3  4
#?

How do you solve #x + 3 = (x2)#?

How do you solve #32n+46=1+8n#?

What is the second derivative of #f(x)=x/(x^2+1)
#?

Question #65c13

Question #984b4

Question #b5a4d

How would you find the volume bounded by the coordinate planes and by the plane 3x + 2y + 2z = 6?

How do you graph #y=sin^1x# over the interval #1<=x<=1#?

If #f(x) = x^24# and #g# is a differentiable function of #x#, what is the derivative of #f(g(x))#?

How do you differentiate #f(x) = x^3sqrt(7x+1)# using the product rule?

What is the value of #\lim _ { x \rightarrow  3} \frac { x ^ { 2}  9} { x ^ { 2}  2x  15} #?

What is an antiderivative of #3sec^2x + 2#?

How do you find the second derivative of #sin(2x)#?

How do you find the exact values of the sine, cosine, and tangent of the angle #(13pi)/12#?

How do you find the area of the surface generated by rotating the curve about the yaxis #y=1/4x^4+1/8x^2, 1<=x<=2#?

Question #eb959

How do you integrate #int (6(5  x))/( (x  7)(4  x))# using partial fractions?

What is the derivative of this function #sin^1 (5x)#?

If #f(x)= 3x^32 # and #g(x) = e^(2x #, what is #f'(g(x)) #?

If #y^3+y=x^2#, what is #(dy)/(dx)#?

What is the equation of the line that goes through #(3, 6)# and is parallel to the line #3x+y10=0#?

What is the derivative of #y= (5x)/sqrt (x^2+9)#?

How do you differentiate #f(x) = 4/sqrt(tan^3(1/x) # using the chain rule?

How to solve this limit?#lim_(x>oo)(xa^(x+1)+1);ain(0,1)#

How do you simplify #(5)^2#?

How do you differentiate #y=sin^1(3x^5+1)^3#?

The temperature drops from 48°C to 21°C in 9 hours. What is the average temperature change per hour?

How do you graph the equation #y=3#?

How do you write 0.6% as a fraction?

How do you prove that the #lim_(x to 2)(x^2 5) = 1# using the formal definition of a limit?

Let #a# is #real# and #epsilon>0#. Given #V_epsilon(a)={x : xa<epsilon}#. How to find #gamma>0# so that #V_gamma(a)=V_epsilon(a)nnV_delta(a)# ?

How do you differentiate #y = ((sin(x))^6 (tan(x))^2) / (x^2 + 2)^2#?

How do you find the exact value of #tan(sin^1(0.1))#?

What are the critical values, if any, of #f(x) = xe^(2x)#?

How do you find the derivative of #sqrtx+sqrty=9#?

What is the sum of this geometric series. #sum2(3)^( n1)# for n=1 to 6?

How to prove that #{1/2^n}# is bounded series ?

What is the derivative of #x(6^(2x))#?

How do you find #int(x^21/x^2+root3x)dx#?

Let #a# is #real# and #epsilon>0#. Given #V_epsilon(a)={x : xa<epsilon}#. How to find #gamma>0# so that #V_gamma(a)=V_epsilon(a)nnV_delta(a)# ?

How do you solve #3\ln ( x  5) =  3#?

What is #int tan^3(x)*sec(x)dx#?

Question #03e6a

How do you differentiate #f(x)= ( x + 1 )/ ( secx )# using the quotient rule?

What is the equation of the tangent line of #f(x) =sqrt(ln(sinx))# at # x = pi/4#?

How do you find the limits of #lim root(3)t +12t2t^2 where t = oo#?

How do you evaluate limits of # lim 9/(x3)^2# where x3?

What is the Cartesian form of #( 6 , (  16pi)/3 ) #?

Question #4f2f7

How do you find the derivative of #ln(ln(3x))#?

How do you use the limit comparison test to determine if #Sigma tan(1/n)# from #[1,oo)# is convergent or divergent?

How do you find the derivative of #s=tan^2t#?

A soccer ball kicked at the goal travels in a path given by the parametric equations: x=50t; #y=16t^2+32t#, Suppose the ball enters the goal at a height of 5ft. How far away from the goal was the kicker?

How do you use implicit differentiation to find dy/dx given #tanx+csc2y=1#?

Use the principle of mathematical induction to prove that?: See picture

What is the equation of the line that is normal to #f(x)= x/e^(2x2) # at # x= 1 #?

Question #f6a18

How do you find the linearization at a=1 of #f(x) = 2 ln(x)#?

Question #b399e

Question #3ded9

How do you find the limit of #ln(sinx)# as #x>0^#?

How do you determine if the series the converges conditionally, absolutely or diverges given #Sigma (cos(npi))/(n+1)# from #[1,oo)#?

The terminal side of #theta# in standard position contains (5,12), how do you find the exact values of the six trigonometric functions of #theta#?

How do you find the period of # h(t) = 4*sin(3t) + 3*sin(tsqrt3)#?

How do you find the inverse of #f(x) = 6x^3  3#?

How many ways can 14 books be organized on a shelf?

What is the integral of #ln(x+1)#?

What is the integral of #sec^3(x)#?

Next