z8 Page 2 4 Write the following equalities in exponential form 7 Solve the following logarithmic equations (1) lnx = −
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[PDF] Worksheet: Logarithmic Function - Department of Mathematics
z8 Page 2 4 Write the following equalities in exponential form 7 Solve the following logarithmic equations (1) lnx = −
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Vanier College Sec V Mathematics
Department of Mathematics 201-015-50Worksheet: Logarithmic Function1. Find the value ofy.
(1) log525 =y(2) log31 =y(3) log164 =y(4) log218
=y (5) log51 =y(6) log28 =y(7) log717
=y(8) log319 =y (9) log y32 = 5 (10) log9y=12 (11) log418 =y(12) log9181 =y2. Evaluate.
(1) log31 (2) log44 (3) log773(4)blogb3(3) log2553(4) 16log48
3. Write the following expressions in terms of logs ofx,yandz.
(1) logx2y(2) logx3y2z (3) logpx 3py 2z4(4) logxyz
(5) log xyz (6) logxy 2 (7) log(xy)13 (8) logxpz (9) log 3px 3 pyz (10) log4rx 3y2z4(11) logxrpx
z (12) logrxy 2z 84. Write the following equalities in exponential form.
(1) log381 = 4 (2) log77 = 1 (3) log12
18 = 3 (4) log31 = 0 (5) log 4164=3 (6) log6136 =2 (7) logxy=z(8) logmn=12
5. Write the following equalities in logarithmic form.
(1) 82= 64 (2) 103= 10000 (3) 42=116
(4) 34=181 (5) 12 5 = 32 (6)13 3 = 27 (7)x2z=y(8)px=y6. True or False?
(1) log xy 3 = logx3logy(2) log(ab) = logalogb(3) logxk=klogx (4) (loga)(logb) = log(a+b) (5)logalogb= log(ab) (6) (lna)k=klna (7) log aaa=a(8)ln1x = lnx(9) lnpx xk= 2k7. Solve the following logarithmic equations.
(1) lnx=3 (2) log(3x2) = 2 (3) 2logx= log2 + log(3x4) (4) logx+ log(x1) = log(4x) (5) log3(x+ 25)log3(x1) = 3 (6) log9(x5) + log9(x+ 3) = 1
(7) logx+ log(x3) = 1 (8) log2(x2) + log2(x+ 1) = 28. Prove the following statements.
(1) log pb x= 2logbx(2) log1pb px=logbx(3) logb4x2= logbpx9. Given that log2 =x, log3 =yand log7 =z, express the following expressions
in terms ofx,y, andz. (1) log12 (2) log200 (3) log 143(4) log0:3 (5) log1:5 (6) log10:5 (7) log15 (8) log60007
10. Solve the following equations.
(1) 3 x2 = 12 (2) 31x= 2 (3) 4 x= 5x+1(4) 61x= 10x (5) 32x+1= 2x2(6)101 +ex= 2
(7) 52x5x12 = 0 (8)e2x2ex= 15
11. Draw the graph of each of the following logarithmic functions, and analyze each
of them completely. (1)f(x) = logx(2)f(x) = logx (3)f(x) =log(x3) (4)f(x) =2log3(3x) (5)f(x) =ln(x+ 1) (6)f(x) = 2ln12 (x+ 3) (7)f(x) = ln(2x+ 4) (8)f(x) =2ln(3x+ 6)12. Find the inverse of each of the following functions.
(1)f(x) = log2(x3)5 (2)f(x) = 3log3(x+ 3) + 1 (3)f(x) =2log2(x1) + 2 (4)f(x) =ln(12x) + 1 (5)f(x) = 2x3 (6)f(x) = 233x1 (7)f(x) =5ex+ 2 (8)f(x) = 12e2x13. 15 000$ is invested in an account that yeilds 5% interest per year. After how
many years will the account be worth 91 221.04$ if the interest is compounded yearly?14. 8 000$ is invested in an account that yeilds 6% interest per year. After how
many years will the account be worth 13709.60$ if the interest is compounded monthly?15. Starting at the age of 40, an average man loses 5% of his hair every year. At
what age should an average man expect to have half his hair left?16. A bacteria culture starts with 10 00 bacteria and the number doubles every 40
minutes. (a) Find a formula for the number of bacteria at time t. (b) Find the number of bacteria after one hour. (c) After how many minutes will there be 50 000 bacteria?ANSWERS
1. (1) 2
(2) 0 (3) 12 (4)3 (5) 0 (6) 3 (7)1 (8)2 (9) 2 (10) 13 (11)32 (12)22. (1) 0
(2) 1 (3) 3 (4) 3 (5) 32(6) 643. (1) 2logx+ logy (2) 3logx+ 2logylogz (3) 12 logx+23 logy4logz (4) logx+ logy+ logz (5) logxlogylogz (6) 2logx2logy (7) 13 logx+13 logy (8) logx+12 logz (9) 13 (logxlogylogz) (10) 14 logx+12 logylogz (11) 54
logx12 logz (12) 12 logx+ logy4logz
4. (1) 3
4= 81 (2) 7 1= 7 (3) 12 3 =18 (4) 3 0= 1 (5) 4 3=164 (6) 6 2=136 (7)xz=y (8)m12 =n5. (1) log
864 = 2
(2) log1010000 = 3
(3) log 4116=2 (4) log 3181
=4 (5) log 12 32 =5
(6) log 13 27 =3
(7) log xy= 2z (8) log xy=126. (1) True (2) False (3) True (4) False (5) False (6) False (7) True (8) True
7. (1)S=fe3g
(2)S=f34g (3)S=f2;4g (4)S=f5g (5)S=f2g (6)S=f6g (7)S=f5g (8)S=f3g8. (1)
log pb x= 2logbx log pb x=logxlog pb logx1 2 logb = 2 logxlogb = 2log bx(2) log 1pb px=logbx log 1pb px=logpx log 1pb 12 logx 12 logb =logxlogb =logbx(3) log b4x2= logbpx log b4x2=logx2logb42logx4logb
12 logxlogb 12 logbx = log bpx9. (1) 2x+y (2)x+ 2 (3)xy+z (4)y1 (5)yx (6)y+zx (7) 1x+y (8)x+yz+ 310. (1)S=f2:402g
(2)S=f0:369g (3)S=f7:213g (4)S=f0:438g (5)S=f1:652g (6)S=fln4g (7)S=flog54g (8)S=fln5g11. (1)
Dom(f) =]0;+1[
R(f) =R
Zeros: 1
Y-intercept: None
Variation:
f(x)%ifx2]0;+1[ f(x)&ifx2 ;Extremums: Max: None, Min: None
Sign: f(x)0 ifx2]0;1] f(x)0 ifx2[1;+1[(2)Dom(f) =] 1;0[R(f) =R
Zeros:1
Y-intercept: None
Variation:
f(x)%ifx2 ; f(x)&ifx2] 1;0[Extremums: Max: None, Min: None
Sign: f(x)0 ifx2] 1;1] f(x)0 ifx2[1;0[ (3)Dom(f) =]3;+1[
R(f) =R
Zeros: 4
Y-intercept: None
Variation:
f(x)%ifx2 ; f(x)&ifx2]3;+1[Extremums: Max: None, Min: None
Sign: f(x)0 ifx2]3;4] f(x)0 ifx2[4;+1[(4)Dom(f) =] 1;3[R(f) =R
Zeros: 2
Y-intercept:2
Variation:
f(x)%ifx2] 1;3[ f(x)&ifx2 ;Extremums: Max: None, Min: None
Sign: f(x)0 ifx2]2;3[ f(x)0 ifx2] 1;2[ (5)Dom(f) =]1;+1[
R(f) =R
Zeros: 0
Y-intercept: 0
Variation:
f(x)%ifx2 ; f(x)&ifx2]1;+1[Extremums: Max: None, Min: None
Sign: f(x)0 ifx2]1;0[ f(x)0 ifx2]0;+1[(6)Dom(f) = ]3;+1[R(f) =R
Zeros:1
Y-intercept: 2ln32
Variation:
f(x)%ifx2]3;+1[ f(x)&ifx2 ;Extremums: Max: None, Min: None
Sign: f(x)0 ifx2[1;+1[ f(x)0 ifx2]3;1] (7)Dom(f) =]2;+1[
R(f) =R
Zeros:1:5
Y-intercept: ln4
Variation:
f(x)%ifx2]2;+1[ f(x)&ifx2 ;Extremums: Max: None, Min: None
Sign: f(x)0 ifx2[1:5;+1[ f(x)0 ifx2]2;1:5](8)Dom(f) =] 1;2[R(f) =R
Zeros:53
Y-intercept:2ln6
Variation:
f(x)%ifx2] 1;2[ f(x)&ifx2 ;Extremums: Max: None, Min: None
Sign: f(x)0 ifx2[53 ;2[ f(x)0 ifx2] 1;5312. (1)f1(x) = 2x+5+ 3
(2)f1(x) = 3x13 3 (3)f1(x) =12 102x2+ 1 (4)f1(x) =12 e1x+12 (5)f1(x) = log2(x+ 3) (6)f1(x) =13 log3x+ 12 (7)f1(x) =ln2x5 (8)f1(x) =12quotesdbs_dbs11.pdfusesText_17