Welcome :: Homework Help and Answers :: Mathskey.com

Recent Visits

  
Welcome to Mathskey.com Question & Answers Community. Ask any math/science homework question and receive answers from other members of the community.

13,459 questions

17,854 answers

1,446 comments

808,168 users

Calculus 2 HELP PLEASE!!!?

0 votes
CAN YOU PLEASE SHOW EVERY STEP

1. FIND Y

y'=5sqrt(5x-1); y(1/5)=5

2. INTERGRATE
(1/X^2)(5^1/X) DX

3. D/DX (5^X + 1/SQRT(X) + piX + pi)

4 FIND DY/DX if Y=X^ln(x)

5. FIND DY/DX IF Y= INTERGAL X^2 AT THE TOP AND 1 AT THE BOTTOM
SQRT(1+T^3) DT

6. INTERGRATE
INTERGAL ln(9) at the top and ln(4) at the bottom e^X/2 DX

7. INTERGRATE
INTERGAL 1/3 e^2X COS(e^2x+1) DX

8. INTERGRATE
INTERGAL 2Xsec(X^2)DX

9. INTERGRATE
INTERGAL 2 at the top ad 1 at the bottom log base 2 (x)/x DX

10 INTERGRATE
V^2+V^1/2/V^3 DV
asked Apr 29, 2013 in CALCULUS by chrisgirl Apprentice

11 Answers

0 votes

ʃy' = ʃ5(√5x - 1)dx

5x - 1 = t2

Diferenciate each side with respective x

5dx = 2tdt

Substitute 5dx = 2tdt and 5x - 1 = t2

           = ʃt 2tdt

           = 2ʃt2dt

           = 2(t3 / 3) + C

Substitute t = √(5x - 1)

           = 2(√(5x - 1)3) + C

 

 

answered May 1, 2013 by diane Scholar
0 votes

 ʃ(1 / x2)51 / xdx

Let 1 / x  = t

Diferenciate each side with respective x

(-1 / x2)dx = dt

Substitute (-1 / x2)dx = dt and  1 / x = t

           = ʃ-dt5t

           = -ʃ5tdt

           = -(5t / log5) + C

Substitute t = 1 / x

           = -(51 / x / log5) + C.

 

 

answered May 1, 2013 by diane Scholar
0 votes

3.

d /dx (5x + 1 / sqrt(x) + πx + π)

Recall :  Derivative of (ax ) = ax loga and d / dx(1 / √(x)) = -1 / 2x√(x)

                                                        = 5x log5 + -1 / 2x√(x) + π + 0

                                                        = 5x log5 -1 / (2x√(x)) + π.

 

answered May 1, 2013 by diane Scholar
0 votes

4.

y = xlogx

Diferenciate each side with respective x

dy / dx = logx xlogx - 1 (1 /  x)

            = logx xlogx - 1( 1 /  x)

           = logx / x xlogx - 1 .

          

 

answered May 1, 2013 by diane Scholar
0 votes

ʃ1 / 3 e2x cos(e2x + 1 )dx  = 1 / 3ʃ e2xcos(e2x × e)dx

Let e2x = t

Diferenciate  each side with respective x

2e2xdx = dt

e2x dx = dt  / 2

Substitute e2x  = t and e2x dx = dt  / 2

                                            = 1 / 3ʃdt / 2 cos(te)

                                            = 1 / 6ʃcos(et) dt

                                            = 1 / 6(sinet) / e

                                           = 1 / 6e(sinet).

answered May 1, 2013 by diane Scholar
0 votes

7.

ʃ1 / 3 e2x cos(e2x + 1 )dx  = 1 / 3ʃ e2xcos(e2x × e)dx

Let e2x = t

Diferenciate  each side with respective x

2e2xdx = dt

e2x dx = dt  / 2

Substitute e2x  = t and e2x dx = dt  / 2

                                            = 1 / 3ʃdt / 2 cos(te)

                                            = 1 / 6ʃcos(et) dt

                                            = 1 / 6(sinet) / e

                                           = 1 / 6e(sinet).

answered May 1, 2013 by diane Scholar
0 votes

8.

ʃ2xsec(x2)dx = ʃ2xdxsec(x2)

Let x2 = t

Diferenciate  each side with respective x

2xdx = dt

Substitute x2 = t and 2xdx = dt

                                            = ʃdt sec(t)

                                            = ʃsec(t) dt

                                            = log|sec(t) + tan(t)| + C.

answered May 2, 2013 by diane Scholar
0 votes

10.

ʃ(V2 + V1 / 2  /  V3)DV = ʃ(V2 DV+ ʃ(V1 / 2 /  V3)DV

Integral V2  = V3 / 3 and integral Vn = Vn + 1

                                           = V3 / 3 +ʃ V -5 / 2DV

                                          = V3 / 3 + V -3 / 2 / -3 / 2 + C

                                          = V3 / 3 +(-2 / 3) V -3 / 2 + C.

answered May 2, 2013 by diane Scholar
0 votes

4) y = x^iogx

dy/dx = d/dx(x^logx)

let logx = t

Then differentiate each side

dt = 1/x*dx

dy/dx = d/dt(x^t)

dy/dx = t*x^(t-1)dt   { d/dx(x^n) = n*x^(n-1)}

dy/dx = tx^(t-1)(1/x)

substitute t = logx

dy/dx = logx*x^(logx - 1)(1/x)

dy/dx =( logx*x^(logx - 1) )/x

answered May 14, 2013 by jeevitha Novice
0 votes

6) image

By Substitution method

image

image

image

image

Now the integral becomes

image

image

image

image

image

image

image

image

image

image

answered Jul 14, 2014 by david Expert

Related questions

asked Apr 21, 2014 in CALCULUS by anonymous
asked Apr 21, 2014 in CALCULUS by anonymous
asked Nov 16, 2014 in CALCULUS by anonymous
asked Nov 13, 2014 in CALCULUS by anonymous
asked Sep 24, 2014 in CALCULUS by anonymous
asked Sep 5, 2014 in CALCULUS by anonymous
...