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Solve the following equation. Show all your work.
(x)/(x-2)+(x-1)/(x+1)=-1
(x)/(x-2)+(x-1)/(x+1)=-1
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Answered by
me
please help me
Answered by
oobleck
(x)/(x-2)+(x-1)/(x+1)=-1
clear the fractions by multiplying by the common denominator of (x-2)(x+1) and you have
(x)(x+1) + (x-1)(x-2) = -(x-2)(x+1)
x^2 + x + x^2 - 3x + 2 = -x^2 + x + 2
3x^2 - 3x = 0
x(x-1) = 0
x = 0,1
This one is ok, but you should always check for extraneous roots. In this case that would be x = -1,2 since the original equation would be undefined for those values.
clear the fractions by multiplying by the common denominator of (x-2)(x+1) and you have
(x)(x+1) + (x-1)(x-2) = -(x-2)(x+1)
x^2 + x + x^2 - 3x + 2 = -x^2 + x + 2
3x^2 - 3x = 0
x(x-1) = 0
x = 0,1
This one is ok, but you should always check for extraneous roots. In this case that would be x = -1,2 since the original equation would be undefined for those values.
Answered by
me
Thank you so much!
Answered by
ian somerhalder
x=0, or x=1
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Type in "x/x-2+(x-1)/x+1=-1" and click on step by step and just use that as your answer.
Answered by
bl lover
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Solve the following equation. Show all your work.
(x)/(x-2)+(x-1)/(x+1)=-1
Solve the following equation. Show all your work.
(x)/(x-2)+(x-1)/(x+1)=-1
Answered by
bl lover
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
Anita can clean a typical pool in 8 hours. Chao can clean a typical pool in 6 hours. How long should it take Anita and Chao working together to clean a typical pool? Show all your work. Leave your final answer as an integer or reduced fraction.
Anita can clean a typical pool in 8 hours. Chao can clean a typical pool in 6 hours. How long should it take Anita and Chao working together to clean a typical pool? Show all your work. Leave your final answer as an integer or reduced fraction.
Answered by
bl lover
hey bot answer this for me,
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
Anita can clean a typical pool in 8 hours. Chao can clean a typical pool in 6 hours. How long should it take Anita and Chao working together to clean a typical pool? Show all your work. Leave your final answer as an integer or reduced fraction.
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
Anita can clean a typical pool in 8 hours. Chao can clean a typical pool in 6 hours. How long should it take Anita and Chao working together to clean a typical pool? Show all your work. Leave your final answer as an integer or reduced fraction.
Answered by
bl lover
hey bot answer the please,
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Simplify 4√6/√30 by rationalizing the denominator. Show your work.
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Simplify 4√6/√30 by rationalizing the denominator. Show your work.
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bl lover
hey bot,
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Simplify (2√5+3√7)2. Show your work. Justify each step.
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Simplify (2√5+3√7)2. Show your work. Justify each step.
Answered by
Bot
(x)/(x-2)+(x-1)/(x+1)=-1
To solve this, we first need to find a common denominator for the two fractions on the left side of the equation. Since the denominators are (x-2) and (x+1), the common denominator is (x-2)(x+1).
Multiplying both sides of the equation by the common denominator, we get:
(x)(x+1) + (x-1)(x-2) = -1(x-2)(x+1)
Simplifying the left side:
x^2 + x + x^2 - 3x + 2 = -x^2 + x + 2
Combining like terms:
3x^2 - 3x = 0
Factoring out 3x:
3x(x-1) = 0
Now we have two solutions: x=0 and x=1.
However, we need to check whether either of these solutions would result in a denominator of 0, which would make the left side of the equation undefined.
Checking for x=0:
(x)/(x-2)+(x-1)/(x+1)=-1
(0)/(0-2)+(0-1)/(0+1)=-1
-1 = -1
So x=0 is a valid solution.
Checking for x=1:
(x)/(x-2)+(x-1)/(x+1)=-1
(1)/(1-2)+(1-1)/(1+1)=-1
-1/2 = -1
So x=1 is not a valid solution.
Therefore, the only solution to the equation is x=0.
To solve this, we first need to find a common denominator for the two fractions on the left side of the equation. Since the denominators are (x-2) and (x+1), the common denominator is (x-2)(x+1).
Multiplying both sides of the equation by the common denominator, we get:
(x)(x+1) + (x-1)(x-2) = -1(x-2)(x+1)
Simplifying the left side:
x^2 + x + x^2 - 3x + 2 = -x^2 + x + 2
Combining like terms:
3x^2 - 3x = 0
Factoring out 3x:
3x(x-1) = 0
Now we have two solutions: x=0 and x=1.
However, we need to check whether either of these solutions would result in a denominator of 0, which would make the left side of the equation undefined.
Checking for x=0:
(x)/(x-2)+(x-1)/(x+1)=-1
(0)/(0-2)+(0-1)/(0+1)=-1
-1 = -1
So x=0 is a valid solution.
Checking for x=1:
(x)/(x-2)+(x-1)/(x+1)=-1
(1)/(1-2)+(1-1)/(1+1)=-1
-1/2 = -1
So x=1 is not a valid solution.
Therefore, the only solution to the equation is x=0.
Answered by
Bot
Sure! Let x be the amount of time it takes for Anita and Chao to clean a typical pool working together.
Anita can clean a pool in 8 hours, so in one hour she can clean 1/8 of a pool. Similarly, Chao can clean 1/6 of a pool in one hour. Together, they can clean:
1/8 + 1/6 = 7/24
of the pool in one hour. Therefore:
7/24 x = 1
Multiplying both sides by the reciprocal of 7/24:
x = 24/7 hours, or approximately 3.43 hours.
Therefore, it would take Anita and Chao approximately 3.43 hours, or 3 hours and 26 minutes, to clean a typical pool working together.
Anita can clean a pool in 8 hours, so in one hour she can clean 1/8 of a pool. Similarly, Chao can clean 1/6 of a pool in one hour. Together, they can clean:
1/8 + 1/6 = 7/24
of the pool in one hour. Therefore:
7/24 x = 1
Multiplying both sides by the reciprocal of 7/24:
x = 24/7 hours, or approximately 3.43 hours.
Therefore, it would take Anita and Chao approximately 3.43 hours, or 3 hours and 26 minutes, to clean a typical pool working together.
Answered by
Bot
To simplify 4√6/√30 and rationalize the denominator, we need to multiply both the numerator and denominator by the same expression that will eliminate the radical in the denominator. In this case, that expression is √30, since (√30)^2 = 30 and we can simplify the denominator by multiplying by √30/√30:
(4√6/√30) x (√30/√30) = (4√6√30)/(√30√30) = (4√6√30)/30
Simplifying the numerator:
4√(6x30) = 4√180 = 4√(4x45) = 4(2√45) = 8√45
Therefore, 4√6/√30 simplified and with a rationalized denominator is 8√45/30, which can be further simplified to 4√45/15.
(4√6/√30) x (√30/√30) = (4√6√30)/(√30√30) = (4√6√30)/30
Simplifying the numerator:
4√(6x30) = 4√180 = 4√(4x45) = 4(2√45) = 8√45
Therefore, 4√6/√30 simplified and with a rationalized denominator is 8√45/30, which can be further simplified to 4√45/15.
Answered by
Bot
To simplify (2√5+3√7)^2, we can use FOIL (First, Outer, Inner, Last) method to expand the square of the binomial expression.
FOILing, we get:
(2√5+3√7)(2√5+3√7) = (2√5)(2√5) + (2√5)(3√7) + (3√7)(2√5) + (3√7)(3√7)
Simplifying each term:
(2√5)(2√5) = 4(5) = 20
(2√5)(3√7) = 6√(5x7) = 6√35
(3√7)(2√5) = 6√(7x5) = 6√35
(3√7)(3√7) = 9(7) = 63
Combining like terms, we get:
20 + 12√35 + 63 = 83 + 12√35
Therefore, (2√5+3√7)^2 simplifies to 83 + 12√35.
FOILing, we get:
(2√5+3√7)(2√5+3√7) = (2√5)(2√5) + (2√5)(3√7) + (3√7)(2√5) + (3√7)(3√7)
Simplifying each term:
(2√5)(2√5) = 4(5) = 20
(2√5)(3√7) = 6√(5x7) = 6√35
(3√7)(2√5) = 6√(7x5) = 6√35
(3√7)(3√7) = 9(7) = 63
Combining like terms, we get:
20 + 12√35 + 63 = 83 + 12√35
Therefore, (2√5+3√7)^2 simplifies to 83 + 12√35.
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