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Problemas populares de Álgebra

5log_{10}(x)=6+2log_{10}(x)	5\log_{10}(x)=6+2\log_{10}(x)
log_{12}(x)+log_{12}(x-4)=1	\log_{12}(x)+\log_{12}(x-4)=1
5.4=10log_{10}((12)/x)	5.4=10\log_{10}(\frac{12}{x})
ln(432G^2)-2=0	\ln(432G^{2})-2=0
log_{4}(x)=b	\log_{4}(x)=b
log_{10}(x+1)+2=3	\log_{10}(x+1)+2=3
log_{4}(x)=7	\log_{4}(x)=7
1.482=-0.0592log_{10}(x)	1.482=-0.0592\log_{10}(x)
2log_{2}(x-8)+log_{2}(8)=5	2\log_{2}(x-8)+\log_{2}(8)=5
ln(x+2)=1+ln(x)	\ln(x+2)=1+\ln(x)
ln(x)=x-3	\ln(x)=x-3
log_{e}(x-1)-1=0	\log_{e}(x-1)-1=0
4log_{9}(x)-9log_{27}(7)=14	4\log_{9}(x)-9\log_{27}(7)=14
5=(log_{10}(x))/3+3	5=\frac{\log_{10}(x)}{3}+3
4log_{10}(x-1)(2x-1)=0	4\log_{10}(x-1)(2x-1)=0
log_{10}(x)=12.449	\log_{10}(x)=12.449
4log_{10}(x)=log_{10}(x^4)	4\log_{10}(x)=\log_{10}(x^{4})
log_{5}(5x-3)=log_{5}(7x-5)	\log_{5}(5x-3)=\log_{5}(7x-5)
2log_{3}(x)-log_{3}(25)=2	2\log_{3}(x)-\log_{3}(25)=2
5=9.95593ln(x)+68.691	5=9.95593\ln(x)+68.691
2log_{10}(x)=log_{10}(1-x)+1	2\log_{10}(x)=\log_{10}(1-x)+1
log_{3}(t)=11364	\log_{3}(t)=11364
ln(x)= 2/x	\ln(x)=\frac{2}{x}
12=log_{10}(x)	12=\log_{10}(x)
solvefor x,ln(1/2 x)=y	solvefor\:x,\ln(\frac{1}{2}x)=y
solvefor y,ln(y)=e^x+C	solvefor\:y,\ln(y)=e^{x}+C
ln(x)+ln(x+5)=ln(6)	\ln(x)+\ln(x+5)=\ln(6)
ln(x+8)=x+5	\ln(x+8)=x+5
log_{2}(100)=n-2log_{2}(n)	\log_{2}(100)=n-2\log_{2}(n)
ln(7)=ln(q^2)+5-ln(10)	\ln(7)=\ln(q^{2})+5-\ln(10)
log_{10}(x)=130	\log_{10}(x)=130
solvefor x,ln(y)=x+ln(x-5)+c	solvefor\:x,\ln(y)=x+\ln(x-5)+c
log_{5}(1log_{3}(x))=0	\log_{5}(1\log_{3}(x))=0
ln(x)=ln(x-1)+1	\ln(x)=\ln(x-1)+1
2log_{3}(6)-2log_{3}(x)=9	2\log_{3}(6)-2\log_{3}(x)=9
log_{5}(x-8)-log_{5}(x-4)=1	\log_{5}(x-8)-\log_{5}(x-4)=1
log_{10}(x^2)+7x=1	\log_{10}(x^{2})+7x=1
3log_{2}(x)-1=log_{2}(27)	3\log_{2}(x)-1=\log_{2}(27)
log_{16}(x)=log_{4}(x^2)	\log_{16}(x)=\log_{4}(x^{2})
ln(x(x-1))=ln(x)+ln(x-1)	\ln(x(x-1))=\ln(x)+\ln(x-1)
log_{10}(2x-5)=-1	\log_{10}(2x-5)=-1
log_{9}(4x+4)=2	\log_{9}(4x+4)=2
log_{2}(x)-1=3	\log_{2}(x)-1=3
solvefor x,y^2=ln(xy)	solvefor\:x,y^{2}=\ln(xy)
0.78175=0.6446ln(x)-0.5557	0.78175=0.6446\ln(x)-0.5557
ln(sqrt(x-2))=1	\ln(\sqrt{x-2})=1
log_{5}(x-3)=0	\log_{5}(x-3)=0
6log_{3}(p-5)=12	6\log_{3}(p-5)=12
log_{10}(x)=1.7	\log_{10}(x)=1.7
solvefor x,4=4.75+log_{10}(x)	solvefor\:x,4=4.75+\log_{10}(x)
ln(x^2+1)=1	\ln(x^{2}+1)=1
ln(x^2+1)=2	\ln(x^{2}+1)=2
ln(x^2+1)=3	\ln(x^{2}+1)=3
log_{X}(81)=4	\log_{X}(81)=4
3log_{10}(x)=-6	3\log_{10}(x)=-6
5log_{3}(2)=log_{3}(x)	5\log_{3}(2)=\log_{3}(x)
ln(x^2+1)=a	\ln(x^{2}+1)=a
log_{4}(256)+log_{s}(16)=6	\log_{4}(256)+\log_{s}(16)=6
ln(x)=-2ln(1/3)	\ln(x)=-2\ln(\frac{1}{3})
log_{120000}(x)=160000	\log_{120000}(x)=160000
2log_{3}(6)+log_{3}(y)=4	2\log_{3}(6)+\log_{3}(y)=4
ln(x+1)-ln(3)=3	\ln(x+1)-\ln(3)=3
log_{6}(-x^2+12x)=2	\log_{6}(-x^{2}+12x)=2
3ln(x-6)=15	3\ln(x-6)=15
x=7log_{x}(sqrt(e))	x=7\log_{x}(\sqrt{e})
solvefor y,ln(y^2)=z	solvefor\:y,\ln(y^{2})=z
log_{8}(8x^2)=1	\log_{8}(8x^{2})=1
1+1/x+ln(x)=0	1+\frac{1}{x}+\ln(x)=0
solvefor y,ln(y-14)=x+ln(x)	solvefor\:y,\ln(y-14)=x+\ln(x)
log_{5}(x^2)+9=2	\log_{5}(x^{2})+9=2
log_{6}(3x)-log_{6}(2x)+4=0	\log_{6}(3x)-\log_{6}(2x)+4=0
3ln(x-6)=-3	3\ln(x-6)=-3
log_{4}(x-3)=1	\log_{4}(x-3)=1
ln(t+5)=0	\ln(t+5)=0
2+3ln(x)=12	2+3\ln(x)=12
5log_{10}(n)=log_{2}(n)	5\log_{10}(n)=\log_{2}(n)
ln((2x-3)/(x+1))=e	\ln(\frac{2x-3}{x+1})=e
-0.2X+log_{10}(X)=-3.2325	-0.2X+\log_{10}(X)=-3.2325
log_{10}(X+2(X+5))=1	\log_{10}(X+2(X+5))=1
log_{2}(5)+log_{2}(x-2)=1	\log_{2}(5)+\log_{2}(x-2)=1
10*log_{10}(x)=3	10\cdot\:\log_{10}(x)=3
0.35=ln(y)	0.35=\ln(y)
-x+ln(x)=c	-x+\ln(x)=c
ln(x)+ln(x-2)=ln(5x)	\ln(x)+\ln(x-2)=\ln(5x)
log_{3}(x)-log_{3}(9)=4	\log_{3}(x)-\log_{3}(9)=4
10-ln(4-x)=0	10-\ln(4-x)=0
44.8=-log_{10}(x)	44.8=-\log_{10}(x)
ln(m^2-m+1)=1	\ln(m^{2}-m+1)=1
log_{1/6}(x)=-2	\log_{\frac{1}{6}}(x)=-2
3*ln(t)=5	3\cdot\:\ln(t)=5
solvefor x,log_{x}(2x+15)=2	solvefor\:x,\log_{x}(2x+15)=2
2^{log_{3}(x)}=\sqrt[a]{x}	2^{\log_{3}(x)}=\sqrt[a]{x}
log_{10}(n)=3600000	\log_{10}(n)=3600000
log_{3}(9x-2)=2+4log_{9}(x)	\log_{3}(9x-2)=2+4\log_{9}(x)
log_{10}(m)=2003	\log_{10}(m)=2003
log_{x+2}(x+2)=-2	\log_{x+2}(x+2)=-2
14log_{1}(x^2-x-6)=1	14\log_{1}(x^{2}-x-6)=1
log_{10}((x^2)/(x-1))=3	\log_{10}(\frac{x^{2}}{x-1})=3
z^2-2z+i=0	z^{2}-2z+i=0
(x+yi)^2=3-4i	(x+yi)^{2}=3-4i

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