We have already seen how to solve equations such as 2 x=5using technology. We now consider an
algebraic method.
By definition, the exact solution is x= log 25 , but we need to know how to evaluate this number.
We therefore consider taking the logarithm of both sides of the original equation:log(2x) = log 5
) xlog 2 = log 5 flogarithm lawg) x=log 5
log 2We conclude that log 2 5=log 5
log 2.
In general: the solution to ax=b where a> 0 , b> 0 is x= logab=
logb
loga:
Example 11 Self Tutor
Use logarithms to solve forx, giving answers correct to 3 significant figures:
a 2 x=30 b (1:02)x=2: 79 c 3 x=0: 05a 2 x=30) x=
log 30
log 2
) x¼ 4 : 91b (1:02)x=2: 79) x=log(2:79)
log(1:02)
) x¼ 51 : 8c 3 x=0: 05) x=log(0:05)
log 3
) x¼¡ 2 : 73Example 12 Self Tutor
Show that log 2 11 =log 11
log 2. Hence find log 211.
Let log 2 11 =x) 2 x=11
) log(2x) = log 11
) xlog 2 = log 11) x=log 11
log 2EXPONENTIAL AND LOGARITHMIC
EQUATIONS [3.10]
E
) log 2 11 =log 11
log 2¼ 3 : 46
634 Logarithms (Chapter 31)IGCSE01
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Y:\HAESE\IGCSE01\IG01_31\634IGCSE01_31.CDR Monday, 27 October 2008 3:02:12 PM PETER