What is the integral of 3^x?

6 ANSWERS

1. 
   

   
   
   let 3^x=u
   
   then xlog3=logu
   
   differentiating
   
   ln3dx=(1/u)du or dx=(1/ln3)(1/u)du.......(1)
   
   now integration of 3^x is
   
   integ{3^xdx
   
   =integ{u*(1/ln3)*(1/u)du
   
   =int{(1/ln3)du
   
   =(1/ln3)u +constant
   
   put u=3^x
   
   result is
   
   (1/ln3)*3^x +c
   
   

   Report (0) (0)  |   earlier  

2. 
   

   That looks right to me.  

   Report (0) (0)  |   earlier  

3. 
   

   No, because x appears in the exponent.
   
   The answer is 3^x / ln (3) +C
   
   let 3^x = u
   
   x ln (3) = ln (u)
   
   ln (3) dx = du/u
   
   dx = du / ln(3) u
   
   ∫ 3^x dx = ∫ u du / ln(3) u
   
   = ∫ du / ln(3)
   
   =u / ln (3) +C
   
   = 3^x / ln (3) +C
   
   

   Report (0) (0)  |   earlier  

4. 
   

   yup. just add 1 to the exponent and divide it by the exponent plus one
   
   [3^(x+1)] / x+1

   Report (0) (0)  |   earlier  

5. 
   

   It's (3^x)/Log(3) + constant if it's indefinite.

   Report (0) (0)  |   earlier  

6. 
   

   Maybe it would help to know the derivative rule for arbitrary bases with the variable in the exponent:
   
   d/dn [ aⁿ ] = ln(a) · aⁿ
   
   You're probably familiar with one special case where the base happens to be the constant e:
   
   d/dn [ eⁿ ] = ln(e) · eⁿ = eⁿ
   
   This is because ln(e) = 1
   
   The above is the more general case though.
   
   ——————————————————————————————————————
   
   That derivative can be proven easily:
   
   y = aⁿ
   
   ln(y) = ln(aⁿ)
   
   Use the rules of log to factor out the exponent:
   
   ln(y) = n·ln(a)
   
   Take the derivative:
   
   d/dx [ ln(y) ] = d/dx [ n·ln(a) ]
   
   1/y · y' = ln(a)
   
   y' = ln(a)·y
   
   Replace y with what it is equal to in the original problem:
   
   y' = ln(a)·aⁿ
   
   ——————————————————————————————————————
   
   When you take the derivative of something with an arbitrary base, you *multiply* by the LN of the base.
   
   Therefore, to take this integral, you want to *divide* by the LN of the base.
   
   ——————————————————————————————————————
   
   ∫ 3ⁿ dn = 3ⁿ/ln(3) + C
   
   The integral you want is not what you provided; it is actually 3^(x)/ln(3).
   
   ——————————————————————————————————————
   
   All you need is to recall the above; this doesn't really require using anything u-substitutions or anything fancy. If you really want to do that though, you can do many things, including the below:
   
   ——————————————————————————————————————
   
   ∫ 3ⁿ dn
   
   Use e and ln, opposite operations:
   
   = ∫ e^[ ln(3ⁿ) ] dn
   
   Use the rule of logs that lets you factor out an exponent:
   
   = ∫ e^[ n·ln(3) ] dn
   
   Let u = n·ln(3)
   
   Then du = ln(3)dx
   
   And dx = du / ln(3)
   
   Substitute and integrate:
   
   → ∫ e^[ u ] du / ln(3)
   
   = e^[ u ] / ln(3) + C
   
   = e^[ n·ln(3) ] / ln(3) + C
   
   Factor out n from the exponent, and then cancel e and ln:
   
   = e^[ ln(3) ]ⁿ / ln(3) + C
   
   = 3ⁿ / ln(3) + C

   Report (0) (0)  |   earlier