Indefinite Integral

Initial Conditions

3 Activities

Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

f(x)=x33−2x+cos⁡xf\left(x\right)=\frac{x^3}{3}-2x+\cos xf(x)=3x3​−2x+cosx

f(x)=x33−2x+cos⁡x+2f\left(x\right)=\frac{x^3}{3}-2x+\cos x+2f(x)=3x3​−2x+cosx+2

f(x)=x33−2x−cos⁡xf\left(x\right)=\frac{x^3}{3}-2x-\cos xf(x)=3x3​−2x−cosx

f(x)=x33−2x−cos⁡x+4f\left(x\right)=\frac{x^3}{3}-2x-\cos x+4f(x)=3x3​−2x−cosx+4

f(x)=x33−2x−cos⁡x+5xf\left(x\right)=\frac{x^3}{3}-2x-\cos x+5xf(x)=3x3​−2x−cosx+5x

I don't know

Applications of Integration: Position, Velocity and Acceleration

If the accelertion of a particle is given by a(x)=2x+xa\left(x\right)=2^x+xa(x)=2x+x, and v(0)=s(0)=0v\left(0\right)=s\left(0\right)=0v(0)=s(0)=0, then the displacement of the particle s(x)s\left(x\right)s(x) is

Practice: Indefinite Integral

Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Practice: Indefinite Integral

Practice: Indefinite Integral
Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Indefinite Integral

Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Practice: Indefinite Integral (~F2018 Final Q26)

Practice: Indefinite Integral
Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Exponential Functions: $f$ from $f''$

Given f′′(x)=5ex+2sin⁡xf''(x)=5e^x+2\sin xf′′(x)=5ex+2sinx  and given f(0)=0f(0)=0f(0)=0, f(π)=0f(\pi)=0f(π)=0, find f(x)f(x)f(x). Enter "f(x)=..."

Practice: Indefinite Integral
Find f(x)f\left(x\right)f(x), given that f′′(x)=x2−2+sin⁡xf''\left(x\right)=x^2-2+\sin xf′′(x)=x2−2+sinx, f(0)=3f\left(0\right)=3f(0)=3 and f′(3)=1f'(3)=1f′(3)=1

Practice: Indefinite Integral
Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Applications of Integration: Position, Velocity and Acceleration

If the acceleartion of a particle is given by a(x)=2x+xa\left(x\right)=2^x+xa(x)=2x+x, and v(0)=s(0)=0v\left(0\right)=s\left(0\right)=0v(0)=s(0)=0, then the displacement of the particle s(x)s\left(x\right)s(x) is

Initial Conditions

Find the function y=f(x)y=f(x)y=f(x) if
y′′=3x−5/2y′(1)=1y(4)=6y''=3x^{-5/2} \quad y'(1)=1 \quad y(4)=6y′′=3x−5/2y′(1)=1y(4)=6

Initial Conditions

Solve the initial value problem 
y′=x2+1xy'=\frac{x^2+1}{\sqrt{x}} y′=x​x2+1​
y(1)=3y(1)=3y(1)=3

Initial Conditions

Solve the initial value problem
y′′=ex/2y′(0)=3y(0)=5y''=e^{x/2} \quad y'(0)=3 \quad y(0)=5y′′=ex/2y′(0)=3y(0)=5

Initial Conditions

Find the function f(x)f(x)f(x) whose derivative is 4x−1/x24x-1/x^24x−1/x2 forx>0 x>0x>0 and for which f(1)=−1f(1)=-1f(1)=−1.

Solve the initial value problem 
f(x)=4x+x22+5,F(1)=1/3\displaystyle f(x)=4x+\frac{x^2}{2}+5, F(1)=1/3f(x)=4x+2x2​+5,F(1)=1/3

Solve the initial value problem
f(x)=x+x4x2,F(0)=2\displaystyle f(x)=\frac{\sqrt{x}+x^4}{x^2}, F(0)=2f(x)=x2x​+x4​,F(0)=2

Solve the initial value problem y′=sec⁡2x−e−x,    y(0)=2y'=\sec^2x-e^{-x},\ \ \ \ y\left(0\right)=2y′=sec2x−e−x,    y(0)=2

Consider Newton's law of cooling dTdt=2−T10\displaystyle\frac{\text{d}T}{\text{d}t}=2-\frac{T}{10}dtdT​=2−10T​  .  Determine T(t)T(t)T(t)  if  T(0)=100T(0)=100T(0)=100

Indefinite Integral

Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Practice: Rearrange First

Q:\bf{Q:}Q: Solve the initial value problem   t2dydt+1=t3t^2\dfrac{dy}{dt} + 1 = t^3t2dtdy​+1=t3  with  y(1)=1y(1) = 1y(1)=1

Q:\bf{Q:}Q: Solve the initial value problem y′=x3+sin⁡2xy'=x^3+\sin2xy′=x3+sin2x   given y(π2)=0y\left(\dfrac{\pi}{2}\right)=0y(2π​)=0

Q:\bf{Q:}Q:Solve the initial value problem y′=sec⁡2x−e−xy'=\sec^2x-e^{-x}y′=sec2x−e−x with y(0)=2y\left(0\right)=2y(0)=2

Solve the initial-value problem
y′=x2+1xy(1)=3\begin{aligned}
y' &=\dfrac{x^2 + 1}{\sqrt{x}}\\
y(1) & = 3
\end{aligned}y′y(1)​=x​x2+1​=3​

Practice: From Second Derivative to Function

Q:\bf{Q:}Q: Solve the initial-value problem y′′=sin⁡2xy'' = \sin 2xy′′=sin2x,  y′(0)=3y'(0)  = 3 y′(0)=3 , y(0)=5y(0) = 5y(0)=5.

Exponential Functions: $f$ from $f''$

Given f′′(x)=5ex+2sin⁡xf''(x)=5e^x+2\sin xf′′(x)=5ex+2sinx  and given f(0)=0f(0)=0f(0)=0, f(π)=0f(\pi)=0f(π)=0, find f(x)f(x)f(x). Enter "f(x)=..."

Solve the initial value problem
y′′=ex/2y′(0)=3y(0)=5\begin{aligned}
y''& = e^{x/2}\\
y'(0)& = 3\\
y(0) &= 5
\end{aligned}y′′y′(0)y(0)​=ex/2=3=5​

Solve the initial value problem y′=sec⁡2x−e−x,  y(0)=2y'=\sec^2x-e^{-x},\ \ y\left(0\right)=2y′=sec2x−e−x,  y(0)=2.

Practice: Indefinite Integral

Practice: Indefinite Integral
Find f(x)f\left(x\right)f(x), given that f′(x)=x2−2+sin⁡xf'\left(x\right)=x^2-2+\sin xf′(x)=x2−2+sinx and f(0)=3f\left(0\right)=3f(0)=3.

Find the antiderivative FFF
f(x)=x+x4x2,F(1)=2\displaystyle f(x)=\frac{\sqrt{x}+x^4}{x^2}, F(1)=2f(x)=x2x​+x4​,F(1)=2

Find the antiderivative FFF 
f(x)=4x+x22+5,F(1)=1/3\displaystyle f(x)=4x+\frac{x^2}{2}+5, F(1)=1/3f(x)=4x+2x2​+5,F(1)=1/3

Indefinite Integral

Related Topics

Initial Conditions

More Initial Conditions Questions:

Applications of Integration: Position, Velocity and Acceleration

Practice: Indefinite Integral

Practice: Indefinite Integral

Indefinite Integral

Practice: Indefinite Integral (~F2018 Final Q26)

Exponential Functions: $f$ from $f''$

Applications of Integration: Position, Velocity and Acceleration

Initial Conditions

Initial Conditions

Initial Conditions

Initial Conditions

Indefinite Integral

Practice: Rearrange First

Practice: From Second Derivative to Function

Exponential Functions: $f$ from $f''$

Practice: Indefinite Integral