Solve logarithmic equation (e^2x)-(7e^x)+10=0?

4 ANSWERS

1. 
   

   Suppose that e^x=a, we get:
   
   a^2-7a+10=0
   
   (a-5)(a-2)=0
   
   a=5 or a=2
   
   e^x=5 or e^x=2
   
   x=ln 5 or x= ln 2

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2. 
   

   Let y = e^x :-
   
   y² - 7y + 10 = 0
   
   (y - 5)(y - 2) = 0
   
   y = 5 , y = 2
   
   e^x = 5 , e^x = 2
   
   x ln e = ln 5 , x ln e = 2
   
   x = ln 5 , x = 2

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3. 
   

   (e^2x)-(7e^x)+10=0
   
   Put e^x = t, then
   
   t^2 - 7t +10 =0
   
   t = (7/2) +/- sqrt[49/4 - 10]
   
   = (7/2) +/- 3
   
   = 1/2 , 6 1/2 = e^x
   
   

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4. 
   

   Let w=e^x
   
   w^2 - 7 w+10=0
   
   solve for the values of w by the quadratic formula or factoring
   
   (w-2)(w-5)
   
   w= 2 and 5
   
   substitute e^x for w
   
   so
   
   e^x = 2
   
   and
   
   e^x = 5
   
   take the ln of both sides
   
   x = ln(2)
   
   and
   
   x= ln(5)
   
   are the solutions to the equation.

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