Solve the following quadratic equations by factorization method: \frac{1}{a+b+x}=\frac{1}{a}+\frac{1}{b}+\frac{1}{x}, a+b\ne 0

tebollahb

tebollahb

Answered question

2021-12-19

Solve the following quadratic equations by factorization method:
1a+b+x=1a+1b+1x,a+b0

Answer & Explanation

Melissa Moore

Melissa Moore

Beginner2021-12-20Added 32 answers

Step 1
Consider the given equation:
1a+1b+1x=1a+b+x,a,b,x0
bx+ax+ababx=1a+b+x
(bx+ax+ab)(a+b+x)=abx
abx+b2x+bx2+a2x+abx+ax2+a2b+ab2+abx=abx
(a+b)x2+a2x+2abx+b2x+a2b+ab2=0
(a+b)x2+(a+b)2x+a2b+ab2=0
(a+b)x2+(a+b)2x+ab(a+b)=0
Divide the above equation by a+b, we have,
x2+(a+b)x+ab=0
Step 2
Solving the above quadratic, we have,
x=(a+b)±(a+b)24ab2
x=(a+b)±a2+2ab+b24ab2
x=(a+b)±a22ab+b22
x=(a+b)±(ab)22
x=(a+b)±(ab)2
x=a,x=b
Jillian Edgerton

Jillian Edgerton

Beginner2021-12-21Added 34 answers

Step 1
In this question we have to solve the quadratic equation by factorization method.
Step 2
Factorization method is method of breaking the quadratic equation into the product of their factors.
let us take an example
x2+3x+4=0
x2+4xx+4=0
x(x+4)-1(x+4)=0
(x-1)(x+4)=0
x=1, -4
Step 3
Now, we have
1a+b+x=1a+1b+1x
1a+b+x1x=1a+1b
x(a+b+x)x(a+b+x)=b+aab
xabxx(a+b+x)=b+aab
1x(a+b+x)=b+aab
ab=ax+bx+x2
x2+ax+bx+ab=0
x(x+a)+b(x+a)=0
(x+a)(x+b)=0
x=-a, -b
nick1337

nick1337

Expert2021-12-28Added 777 answers

Step 1
1/(a+b+x)1/x=(a+b)/ab(x(a+b+x))/(x(a+b+x)=(a+b)/ab1/(x(a+b+x)=1/abx2+(a+b)x+ab=0x=(a+b)+((a+b)24ab)1/2/2x=((a+b)+(ab))/2x=a,b
Step 2
Used quadractic equation.

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