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Graphing y =:
2^(3x-1)
Derivative of:
2^(3x-1)
Identical expressions
two ^(3x- one)
2 to the power of (3x minus 1)
two to the power of (3x minus one)
2(3x-1)
23x-1
2^3x-1
2^(3x-1)dx
Similar expressions
2^(3x+1)

Integral of 2^(3x-1) dx

The solution

You have entered [src]

 1/3           
  /            
 |             
 |   3*x - 1   
 |  2        dx
 |             
/              
-oo

$$\int\limits_{-\infty}^{\frac{1}{3}} 2^{3 x - 1}\, dx$$

Integral(2^(3*x - 1), (x, -oo, 1/3))

Detail solution

There are multiple ways to do this integral.
Method #1
1. Let $u = 3 x - 1$ .
  
  Then let $du = 3 dx$ and substitute $\frac{du}{3}$ :
  
  $\int \frac{2^{u}}{3}\, du$
  1. The integral of a constant times a function is the constant times the integral of the function:
    
    $\int 2^{u}\, du = \frac{\int 2^{u}\, du}{3}$
    1. The integral of an exponential function is itself divided by the natural logarithm of the base.
      
      $\int 2^{u}\, du = \frac{2^{u}}{\log{\left(2 \right)}}$
    So, the result is: $\frac{2^{u}}{3 \log{\left(2 \right)}}$
  Now substitute $u$ back in:
  
  $\frac{2^{3 x - 1}}{3 \log{\left(2 \right)}}$
Method #2
1. Rewrite the integrand:
  
  $2^{3 x - 1} = \frac{2^{3 x}}{2}$
2. The integral of a constant times a function is the constant times the integral of the function:
  
  $\int \frac{2^{3 x}}{2}\, dx = \frac{\int 2^{3 x}\, dx}{2}$
  1. Let $u = 3 x$ .
    
    Then let $du = 3 dx$ and substitute $\frac{du}{3}$ :
    
    $\int \frac{2^{u}}{3}\, du$
    1. The integral of a constant times a function is the constant times the integral of the function:
      
      $\int 2^{u}\, du = \frac{\int 2^{u}\, du}{3}$
      
      The integral of an exponential function is itself divided by the natural logarithm of the base.
      
      $\int 2^{u}\, du = \frac{2^{u}}{\log{\left(2 \right)}}$
      
      So, the result is: $\frac{2^{u}}{3 \log{\left(2 \right)}}$
    Now substitute $u$ back in:
    
    $\frac{2^{3 x}}{3 \log{\left(2 \right)}}$
  So, the result is: $\frac{2^{3 x}}{6 \log{\left(2 \right)}}$
Method #3
1. Rewrite the integrand:
  
  $2^{3 x - 1} = \frac{2^{3 x}}{2}$
2. The integral of a constant times a function is the constant times the integral of the function:
  
  $\int \frac{2^{3 x}}{2}\, dx = \frac{\int 2^{3 x}\, dx}{2}$
  1. Let $u = 3 x$ .
    
    Then let $du = 3 dx$ and substitute $\frac{du}{3}$ :
    
    $\int \frac{2^{u}}{3}\, du$
    1. The integral of a constant times a function is the constant times the integral of the function:
      
      $\int 2^{u}\, du = \frac{\int 2^{u}\, du}{3}$
      
      The integral of an exponential function is itself divided by the natural logarithm of the base.
      
      $\int 2^{u}\, du = \frac{2^{u}}{\log{\left(2 \right)}}$
      
      So, the result is: $\frac{2^{u}}{3 \log{\left(2 \right)}}$
    Now substitute $u$ back in:
    
    $\frac{2^{3 x}}{3 \log{\left(2 \right)}}$
  So, the result is: $\frac{2^{3 x}}{6 \log{\left(2 \right)}}$
Now simplify:

$\frac{2^{3 x}}{6 \log{\left(2 \right)}}$
Add the constant of integration:

$\frac{2^{3 x}}{6 \log{\left(2 \right)}}+ \mathrm{constant}$

The answer is:

$\frac{2^{3 x}}{6 \log{\left(2 \right)}}+ \mathrm{constant}$

The answer (Indefinite) [src]

  /                          
 |                    3*x - 1
 |  3*x - 1          2       
 | 2        dx = C + --------
 |                   3*log(2)
/

$$\int 2^{3 x - 1}\, dx = \frac{2^{3 x - 1}}{3 \log{\left(2 \right)}} + C$$

Simplify

The graph

Plot the graph f(x)

The answer [src]

   1    
--------
3*log(2)

$$\frac{1}{3 \log{\left(2 \right)}}$$

   1    
--------
3*log(2)

$$\frac{1}{3 \log{\left(2 \right)}}$$

1/(3*log(2))

Use the examples entering the upper and lower limits of integration.

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Identical expressions

Similar expressions

Integral of 2^(3x-1) dx

Limits of integration:

The graph:

Piecewise:

The solution

Method #1

Method #2

Method #3