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IB Math SL1/Intens Precalc - Chapter 4 Review
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1. a) Show that xlogby can be written as ylogbx . [Hint: how can you rewrite x using log ?]
b
b) Hence, or otherwise, evaluate 4log27.
2. Solve for x:
a) log (x2) =(log x)2 b) log (x2 −6)= 2
2 2 4
x
c) e2x = 5ex −2 d) 2x+1 ln3=ln16
( )
e) 3x+1 = 4x−2 f) log x = log (4x+4)
4 16
g) log2(2x+1)−log4 x =log23
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1. If log 4 2 = x,log y = 4, and y = 4x2 −2x−6+ z, find y.
2 z
2. Find the exact value of the product of the solutions to the equation 8e2 −2eln x =(ln x)2.
3. The solution of 22x+3 = 2x+1 +3 can be expressed in the form a+log b where a,b∈. Find
2
the values of a and b.
The following two questions came from 2011 IB tests.
4. Let f (x) = 3ln x and g(x) = ln5x3
a) Express g(x) in the form f (x)+lna where a∈+.
b) The graph of g is a transformation of the graph of f. Give a full geometric description
of this transformation.
5. Let f (x) = log x +log 16−log 4 for x > 0.
3 2 3 3
a) Show that f (x) = log3 2x.
b) Find the value of f (0.5) and of f (4.5).
The function f can also be written in the form f (x) = lnax .
lnb
c) i) Write down the values of a and of b.
ii) Hence on graph paper, sketch the graph of f , for −5≤ x ≤5,−5≤ y ≤5.
iii) Write down the equation of the asymptote.
d) Write down the value of f −1(0).
The point A lies on the graph of f. At A, x = 4.5.
e) On your diagram, sketch the graph of f −1, noting clearly the image of point A.
ANSWER KEY
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1. a) Hint: x = blogbx b) 49
2. a) 1,4 b) 8
ln16
5+ 17 5− 17 3 log 16−1
c) ln ,ln d) or 3 or 0.762
2 2 ln9 2
e) log48 or log ( 1 ) or 13.457 f) 2+2 2
4 3 48
log 4
3
g) 1 ,1
4
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1. y =16
2. x = e−2e
3. a = −2,b =3
4. a) f (x)+ln5 b) vertical translation up ln5 units
5. a) Yes, it does.
b) f (0.5) = 0 f (4.5) = 2
c) i) a = 2,b = 3 ii) see below iii) x = 0
d) 1
2
e)
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