Review set 31B
#endboxedheading1aOn the same set of axes, sketch the graphs of y=3x and y= log 3 x.
b State the domain and range of each function.
2 Find the value of:
a log 2p
2 b log 2 p^18 c logp 327 d log 9273 Write the following in terms of logarithms:
a y=4x b y=a¡n
4 Write the following as exponential equations:
a y= log 2 d b M=^12 logak5 Makexthe subject of:
a y= log 3 x b T= logb(3x) c 3 t=5£ 2 x+16 Find the inverse function f¡^1 (x) of:
a f(x)=6x b f(x)=^12 log 5 x7 Solve forx, giving your answers correct to 4 significant figures:
a 3 x= 3000 b (1:13)x=2 c 2 (2
x)
=108a What was the value of the banknote in 1970?
b What was the value of the banknote in 2005?
c9 Write as a single logarithm:
a log 2 5 + log 23 b log 38 ¡log 32 c 2 log 5¡ 1 d 2 log 25 ¡ 1
10 Write as a logarithmic equation in base 10 :a D=100
n^2b G^2 =c^3 d11 Write as an equation without logarithms:
a logM=2x+1 b logG=^12 logd¡ 112 If log 3 7=a and log 3 4=b, find in terms ofaandb:
a log 3¡ 4
7¢
b log 328 c log 3¡ 7
3¢13 Findyin terms ofcanddif:
a log 2 y= 2 log 2 c b log 3 y=^13 log 3 c¡2 log 3 d14 Find log 7200 correct to 3 decimal places.
15 Use a graphics calculator to solve, correct to 4 significant figures:
a 3 x=0: 6 x+2 b log(2x)=(x¡1)(x¡4)Logarithms (Chapter 31) 637The value of a rare banknote has been modelled by V= 400£ 20 :^15 tUS dollars, wheretis the
time in years since 1970.When is the banknote expected to have a value of$100 000?IGCSE01
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100 100
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100 100
Y:\HAESE\IGCSE01\IG01_31\637IGCSE01_31.CDR Friday, 31 October 2008 9:48:35 AM PETER