collegegirl825
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solve the following algebraically
log(x-1)= log(x-2)- log(x+5)
log(x-1)= log(x-2)- log(x+5)
need help with homework problem, due tuesday 08/09/2005
- Thread starter collegegirl825
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Use the log rules you've learned to combine the two logs on the right-hand side. This will give you "log(something) equals log(something else)". Equate "something" to "something else", and solve the resulting rational equation.
Eliz.
Eliz.
collegegirl825
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so would it be
log(x+1)=log((x+5)(x-2))
which would allow the logs to cancel
(x-1)= (x+2)(x-5)
is that right, because my teacher did not throughly explain these laws and how to apply them.
log(x+1)=log((x+5)(x-2))
which would allow the logs to cancel
(x-1)= (x+2)(x-5)
is that right, because my teacher did not throughly explain these laws and how to apply them.
collegegirl825
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I am not sure, maybe it becomes division
collegegirl825
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the division doesn't work you end up getting -3 + or - the square root of 21. it makes the logs negative and that doesn't exist.
collegegirl825
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with the division i got
(x-1)= (x-2)/ (x+5)
multiply both sides by (x+5)
(x-1)(x+5)= (x-2)
x^2+4x-5= x-2
x^2 +3x-3=0
then i used the quadratic formula
-3 + or - the square root of 3^2 - 4(1)(-3)/ 2(1)
-3 + or - the square root of 21.
x= 1.582 and x= -7.582
(x-1)= (x-2)/ (x+5)
multiply both sides by (x+5)
(x-1)(x+5)= (x-2)
x^2+4x-5= x-2
x^2 +3x-3=0
then i used the quadratic formula
-3 + or - the square root of 3^2 - 4(1)(-3)/ 2(1)
-3 + or - the square root of 21.
x= 1.582 and x= -7.582
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Your work is correct. Obviously, the negative solution won't work in the original equation, so toss that. This leaves you with "x = [-3 + sqrt(21)]/2". Check this:
. . . . .x - 1: [-3 + sqrt(21)] / 2 - 1 = [-5 + sqrt(21)] / 2
. . . . .x - 2: [-3 + sqrt(21)] / 2 - 2 = [-7 + sqrt(21)] / 2
. . . . .x + 5: [-3 + sqrt(21)] / 2 + 5 = [7 + sqrt(21)] / 2
. . . . .(x - 2) / (x + 5): [-7 + sqrt(21)] / [7 + sqrt(21)]
Rationalizing this last, we get:
. . . . .[-49 + 14sqrt(21) - 21] / [49 - 21] = [14sqrt(21) - 70] / [28] = [sqrt(21) - 5] / 2
This is the same as the value of the left-hand side's argument, so the solution is valid.
(Note: Solutions are not required to be nice and neat. Don't be scared off just because a solution is messy. You could still be correct.)
Eliz.
. . . . .x - 1: [-3 + sqrt(21)] / 2 - 1 = [-5 + sqrt(21)] / 2
. . . . .x - 2: [-3 + sqrt(21)] / 2 - 2 = [-7 + sqrt(21)] / 2
. . . . .x + 5: [-3 + sqrt(21)] / 2 + 5 = [7 + sqrt(21)] / 2
. . . . .(x - 2) / (x + 5): [-7 + sqrt(21)] / [7 + sqrt(21)]
Rationalizing this last, we get:
. . . . .[-49 + 14sqrt(21) - 21] / [49 - 21] = [14sqrt(21) - 70] / [28] = [sqrt(21) - 5] / 2
This is the same as the value of the left-hand side's argument, so the solution is valid.
(Note: Solutions are not required to be nice and neat. Don't be scared off just because a solution is messy. You could still be correct.)
Eliz.
collegegirl825
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i still do not understand how you got the solutions for
(x-1)
(x-2)
(x+5)
i know that you pluged in the values for x= -3 + the sqaure root of 21/2.
but i still get a negative number when i do this
log {(-3+square root of 21)/2} -1= log {(-3+ square root of 21)/2} -2 - log {(-3+ square root of 21)/2} +5
(x-1)
(x-2)
(x+5)
i know that you pluged in the values for x= -3 + the sqaure root of 21/2.
but i still get a negative number when i do this
log {(-3+square root of 21)/2} -1= log {(-3+ square root of 21)/2} -2 - log {(-3+ square root of 21)/2} +5