Solving Equations Using Logarithms

Coach Name: Sir Muhammad Abdullah Shah

Edexcel IAL WMA12/01/P2/June 2019/Q8 (Exponentials Equations and Logarithms)

  • Find the exact solution of the equation​​ 

82x + 1= 6 

giving your answer in the form​​ a + blog23,​​ where a and b are constants to be found.​​ 

(4)​​ 

  • Using the laws of logarithms, solve​​ 

log57  2y= 2log5 y + 1  1 

(5)

SOLUTION

i-​​ Usng the laws of logarithm.

log282x+1=log26

Applying the power rule to bring (2x+1) down as the coefficient.

2x+1log28=log22 x 3

Applying the multiplication rule on the RHS of equation.​​ 

2x+1log223=log22+log23

2x+1×3×log22=log22+log23

Remember,​​ logaa=1; thus,​​ log22=1

2x+1×3×1=1+log23

6x+3=1+log23

6x= -2+log23

x=-13+16log23

ii-​​ Using the laws of logarithm.

1=2log5y+1=log57-2y

Applying the power rule in reverse that is changing the coefficient (2) as the power of (y+1).  ​​​​ 

1=log5 y+12-log5 7-2y

Applying the division rule,​​ 

1=log5y+127-2y

Writing this exponential equation into log equation. Thereofre, the base in of the indices becomes the base of log. (Remember,​​ logab=k​​ can be converted into exponential expression as​​ b=ak).

51=y+127-2y

35-10y=y+12

35-10y=y2+2y+1

y2+12y-34=0

y2+12y=34

Using completing square method to solve the quadratic equation.

y+62-36=34

y+62=70

y+6= ±70

y=-6±70