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Problemas populares de Álgebra
log_{7}(x)+log_{7}(6x-1)=1
\log_{7}(x)+\log_{7}(6x-1)=1
log_{10}(X+5)=log_{10}(X+2)
\log_{10}(X+5)=\log_{10}(X+2)
ln(x)=ln(e/x)
\ln(x)=\ln(\frac{e}{x})
log_{2}(x)=-5.567133704
\log_{2}(x)=-5.567133704
30=-7020ln(q)
30=-7020\ln(q)
2log_{3}(x+2)=log_{3}(729)
2\log_{3}(x+2)=\log_{3}(729)
solvefor y,ln(y)=9t-8
solvefor\:y,\ln(y)=9t-8
log_{10}(x-10)=10
\log_{10}(x-10)=10
0=log_{5}(x-125)+3
0=\log_{5}(x-125)+3
ln(4k-7)=2,k
\ln(4k-7)=2,k
ln(2)=ln(-1/1+c)
\ln(2)=\ln(-\frac{1}{1}+c)
log_{7}(x)=216
\log_{7}(x)=216
5x-7ln(x)=pi
5x-7\ln(x)=π
ln(1+x)=1+ln(x)
\ln(1+x)=1+\ln(x)
ln(sqrt(x))=1
\ln(\sqrt{x})=1
ln(sqrt(x))=4
\ln(\sqrt{x})=4
ln(sqrt(x))=2
\ln(\sqrt{x})=2
log_{10}(x)=-8.9
\log_{10}(x)=-8.9
4log_{3}(2)=log_{3}(x)
4\log_{3}(2)=\log_{3}(x)
solvefor x,ln(x)-ln(y)=c
solvefor\:x,\ln(x)-\ln(y)=c
4ln(x)=-12
4\ln(x)=-12
log_{4}(a)=5
\log_{4}(a)=5
xy=2x^2y+yln(y)
xy=2x^{2}y+y\ln(y)
log_{2}(x+18)-3=log_{2}(4x)
\log_{2}(x+18)-3=\log_{2}(4x)
solvefor u,log_{5}(u)=t
solvefor\:u,\log_{5}(u)=t
solvefor x,ln(x)=4ln(t)
solvefor\:x,\ln(x)=4\ln(t)
log_{10}(3x-7)=4
\log_{10}(3x-7)=4
log_{4}(x-7)=log_{4}(x-4)+1
\log_{4}(x-7)=\log_{4}(x-4)+1
ln(16x-15)-15ln(1)=0
\ln(16x-15)-15\ln(1)=0
log_{e}(T+273.15)=877572
\log_{e}(T+273.15)=877572
log_{2.71}(x)=2.7
\log_{2.71}(x)=2.7
1/2 =log_{16}(x)
\frac{1}{2}=\log_{16}(x)
solvefor x,log_{2}(2x+1)=3
solvefor\:x,\log_{2}(2x+1)=3
4631=ln(A/(500))
4631=\ln(\frac{A}{500})
solvefor ln(A)=-2kt+c,A
solvefor\:\ln(A)=-2kt+c,A
ln(10x^{13})=65
\ln(10x^{13})=65
log_{4}(3x)-1=log_{4}(-2x+9)
\log_{4}(3x)-1=\log_{4}(-2x+9)
ln(7x+e)=-6
\ln(7x+e)=-6
2ln(x)=ln(2)-3ln(2)
2\ln(x)=\ln(2)-3\ln(2)
log_{2}(5/x)=3
\log_{2}(\frac{5}{x})=3
log_{4}(x+1)-log_{4}(7-2x)=0
\log_{4}(x+1)-\log_{4}(7-2x)=0
log_{b}(x)+2=log_{b}(x+2)
\log_{b}(x)+2=\log_{b}(x+2)
solvefor x,ln(y)=9ln(x+15)
solvefor\:x,\ln(y)=9\ln(x+15)
0=ln(y)
0=\ln(y)
d=20log_{10}(x)
d=20\log_{10}(x)
ln(x)=3.2614400000000…
\ln(x)=3.2614400000000…
4.48=-log_{10}(x)
4.48=-\log_{10}(x)
log_{2}(2x-1)+4=log_{2}(x)
\log_{2}(2x-1)+4=\log_{2}(x)
log_{10}(3x+3)=3
\log_{10}(3x+3)=3
5ln(2x+5)-14=1616
5\ln(2x+5)-14=1616
solvefor x,log_{x}(36)=1.842
solvefor\:x,\log_{x}(36)=1.842
log_{10}(x)=4.4+1.5(2.8)
\log_{10}(x)=4.4+1.5(2.8)
6.8=-log_{10}(x)
6.8=-\log_{10}(x)
ln((x+7)^7)+9=30
\ln((x+7)^{7})+9=30
log_{10}(3x+1)=1-log_{10}(x)
\log_{10}(3x+1)=1-\log_{10}(x)
solvefor x,ln(x-1)=ln(y+3)+c
solvefor\:x,\ln(x-1)=\ln(y+3)+c
log_{3}(x-8)-log_{3}(x)=2
\log_{3}(x-8)-\log_{3}(x)=2
log_{x}(10+3x)=2
\log_{x}(10+3x)=2
(ln(x))/x =0.0975
\frac{\ln(x)}{x}=0.0975
log_{e}(x)+4=log_{e}(x+6)
\log_{e}(x)+4=\log_{e}(x+6)
log_{2}(x)-log_{2}(16)=3
\log_{2}(x)-\log_{2}(16)=3
n=ln^2(x)
n=\ln^{2}(x)
log_{8}(X)= 1/3
\log_{8}(X)=\frac{1}{3}
5ln(6x-2)+13=23
5\ln(6x-2)+13=23
log_{x}(25)=log_{5}(125)-1
\log_{x}(25)=\log_{5}(125)-1
127=log_{2}(x)
127=\log_{2}(x)
12.828=10*ln(2+z)
12.828=10\cdot\:\ln(2+z)
log_{5}(x)+log_{5}(x)=1
\log_{5}(x)+\log_{5}(x)=1
0=2ln(x)-4
0=2\ln(x)-4
log_{7}(x+9)+log_{7}(49)=0
\log_{7}(x+9)+\log_{7}(49)=0
4log_{x}(3)+log_{3}(x)+5=0
4\log_{x}(3)+\log_{3}(x)+5=0
ln(1/3 x+2)=2
\ln(\frac{1}{3}x+2)=2
ln(-x)=ln(1/x)
\ln(-x)=\ln(\frac{1}{x})
ln(2t+1)= 9/4
\ln(2t+1)=\frac{9}{4}
solvefor a,ln(a)+ln(b)=c
solvefor\:a,\ln(a)+\ln(b)=c
0=2ln(x)+2
0=2\ln(x)+2
10log_{10}(R)=340227
10\log_{10}(R)=340227
log_{2}(x+10)-3=0
\log_{2}(x+10)-3=0
3=a+blog_{e}(x)
3=a+b\log_{e}(x)
ln(x)=6.229076539
\ln(x)=6.229076539
0=|ln(x)|
0=\left|\ln(x)\right|
7-ln(-6-x)=0
7-\ln(-6-x)=0
2.5ln(1-x)+1.5x+4.4=0
2.5\ln(1-x)+1.5x+4.4=0
3=-log_{10}(H)
3=-\log_{10}(H)
log_{10}(x)=-1+log_{10}(5)
\log_{10}(x)=-1+\log_{10}(5)
ln(6x-1)=ln(1)-ln(x-1)
\ln(6x-1)=\ln(1)-\ln(x-1)
log_{a}(3)=0.477
\log_{a}(3)=0.477
16=4^2log_{10}(x)
16=4^{2}\log_{10}(x)
log_{e}(x)=6.33099968
\log_{e}(x)=6.33099968
ln(u)=-2
\ln(u)=-2
log_{10}(x)=6372
\log_{10}(x)=6372
2ln(x)=ln(x^{-1})+1
2\ln(x)=\ln(x^{-1})+1
log_{10}((2x+1)/(x+3))=3
\log_{10}(\frac{2x+1}{x+3})=3
log_{10}(x)=-4235
\log_{10}(x)=-4235
log_{10}(x)(1/4)=-1
\log_{10}(x)(\frac{1}{4})=-1
0.44=ln(y)
0.44=\ln(y)
log_{2}(6x+5)=1
\log_{2}(6x+5)=1
solvefor y,x=log_{2}(y-4)
solvefor\:y,x=\log_{2}(y-4)
log_{2}(6x+5)=2
\log_{2}(6x+5)=2
0=log_{3}(x-1)-2
0=\log_{3}(x-1)-2
1
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4737