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Logarithmic Equations Date Period

D 92f0p1t2x uK7uUtoar 7S3oIf2tEw0aTr1eP Y WAml7lr krBiOgshctMsT I uMNabdMer Mw7iOtnhT pITnwfli4nrict0eT LAllsgZe2bXr6aj by Kuta Software LLCKuta Software - Infinite Algebra 2 Name_____ Period____Date_____Logarithmic EquationsSolve each ) log5 x = log( 2 x + 9)2) log( 10 4 x) = log( 10 3 x)3) log( 4 p 2) = log( 5 p + 5)4) log( 4 k 5) = log( 2 k 1)5) log( 2 a + 9) = log( 7 4 a)6) 2log7 2 r = 07) 10 + log3( n + 3) = 108) 2log57 x = 29) log m + 2 = 410) 6log3( x 3) = 2411) log12( v2 + 35) = log12( 12 v 1)12) log9( 11 x + 2) = log9( x2 + 30)-1- S C2b0U1725 TKruAtGah lSKoofltIwfaSr6eC S AAPlolZ XrMiKgNhQtAsp 7 RM0aOdaeB Tw8iCtOhe TI0njfDiznuiHtzee FAdl2g9eTbAraaQ by Kuta Software LLC13) log( 16 + 2 b) = log( b2 4 b)14) ln( n2 + 12) = ln( 9 n 2)15) log x + log8 = 216) log x log2 = 117) log2 + log x = 118) log x + log7 = log3719) log82 + log84 x2 = 120) log9( x + 6) log9 x = log9221) log6( x + 1) log6 x = log62922) log56 + log52 x2 = log54823) ln2 ln( 3 x + 2) = 124) ln( 3 x 1) ln7 = 225) ln( x 3) ln( x 5) = ln5

Logarithmic Equations Date_____ Period____ Solve each equation. 1) log 5 x = log (2x + 9) 2) log (10 − 4x) = log (10 − 3x) 3) log (4p − 2) = log (−5p + 5) 4) log (4k − 5) = log (2k − 1) 5) log (−2a + 9) = log (7 − 4a) 6) 2log 7 −2r = 0 7) −10 + log 3 (n + 3) = −10 8) −2log 5 7x = 2 9) log −m + 2 = 4 10) −6log 3 (x ...

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Transcription of Logarithmic Equations Date Period

1 D 92f0p1t2x uK7uUtoar 7S3oIf2tEw0aTr1eP Y WAml7lr krBiOgshctMsT I uMNabdMer Mw7iOtnhT pITnwfli4nrict0eT LAllsgZe2bXr6aj by Kuta Software LLCKuta Software - Infinite Algebra 2 Name_____ Period____Date_____Logarithmic EquationsSolve each ) log5 x = log( 2 x + 9)2) log( 10 4 x) = log( 10 3 x)3) log( 4 p 2) = log( 5 p + 5)4) log( 4 k 5) = log( 2 k 1)5) log( 2 a + 9) = log( 7 4 a)6) 2log7 2 r = 07) 10 + log3( n + 3) = 108) 2log57 x = 29) log m + 2 = 410) 6log3( x 3) = 2411) log12( v2 + 35) = log12( 12 v 1)12) log9( 11 x + 2) = log9( x2 + 30)-1- S C2b0U1725 TKruAtGah lSKoofltIwfaSr6eC S AAPlolZ XrMiKgNhQtAsp 7 RM0aOdaeB Tw8iCtOhe TI0njfDiznuiHtzee FAdl2g9eTbAraaQ by Kuta Software LLC13) log( 16 + 2 b) = log( b2 4 b)14) ln( n2 + 12) = ln( 9 n 2)15) log x + log8 = 216) log x log2 = 117) log2 + log x = 118) log x + log7 = log3719) log82 + log84 x2 = 120) log9( x + 6) log9 x = log9221) log6( x + 1) log6 x = log62922) log56 + log52 x2 = log54823) ln2 ln( 3 x + 2) = 124) ln( 3 x 1) ln7 = 225) ln( x 3) ln( x 5) = ln526) ln( 4 x + 1) ln3 = 5-2- z g2P0M1z2V 0K4uztZaL OSPoNfBtUwqaMrzew p KAclslu yrOingBhTtZsH 0 rMXa6dCeq swXiIt7hV JIMnsfWi7nJigtPeK JA0ltgYe8bDrTaD by Kuta Software LLCKuta Software - Infinite Algebra 2 Name_____ Period____Date_____Logarithmic EquationsSolve each ) log5 x = log( 2 x + 9){3}2) log( 10 4 x) = log( 10 3 x){0}3) log( 4 p 2)

2 = log( 5 p + 5) { 79}4) log( 4 k 5) = log( 2 k 1){2}5) log( 2 a + 9) = log( 7 4 a){ 1}6) 2log7 2 r = 0 { 12}7) 10 + log3( n + 3) = 10{ 2}8) 2log57 x = 2 { 135}9) log m + 2 = 4{ 100}10) 6log3( x 3) = 24{84}11) log12( v2 + 35) = log12( 12 v 1){ 6}12) log9( 11 x + 2) = log9( x2 + 30){ 7, 4}-1- P g2l0w1U2A lKAuZtYaY 3 SjoGf5t5wCa1rmef z XADlClt Xrwivgyh5tFsZ f iM9axdVev owti7tJho SIgnbfGiun5intkeq iALlYgrePbGrwaT by Kuta Software LLC13) log( 16 + 2 b) = log( b2 4 b){8, 2}14) ln( n2 + 12) = ln( 9 n 2){ 2, 7}15) log x + log8 = 2 { 252}16) log x log2 = 1{20}17) log2 + log x = 1{5}18) log x + log7 = log37 { 377}19) log82 + log84 x2 = 1{1, 1}20) log9( x + 6) log9 x = log92{6}21) log6( x + 1) log6 x = log629 { 128}22) log56 + log52 x2 = log548{2, 2}23) ln2 ln( 3 x + 2) = 1 { 2 2 e3 e}24) ln( 3 x 1) ln7 = 2 { 7 e2 13}25) ln( x 3) ln( x 5) = ln5 { 112}26) ln( 4 x + 1) ln3 = 5 { 3 e5 14}-2-Create your own worksheets like this one with Infinite Algebra 2.

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