find the roots of the following equations by
factorisation
x+1/x-1-x-1/x+1=5/6;x is not equal to 1,-1
Answers
Step-by-step explanation:
1st step is the question
Step-by-step explanation:
QUESTION:
How will you solve the equation (x+1)/(x-1) - (x-1)/(x+1) = 5/6?
ANSWER:
(x+1)/(x-1)-(x-1)/(x+1) = 5/6.
So (x+1)(x+1)/[(x+1)(x-1)]-(x-1)(x-1)/[(x+1)(x-1)] = 5/6.
So [(x+1)(x+1)-(x-1)(x-1)]/[(x+1)((x-1)] = 5/6.
So [(x²+2x+1)-(x²–2x+1)]/(x²–1) = 5/6.
So (x²+2x+1-x+2x-1)/(x²–1) = 5/6.
So 4x/(x²–1) = 5/6.
So 4x = [(5/6)*(x–1) = (5/6)x–5/6.
So (5/6)x²–4x-5/6 = 0.
So 5x²–24x-5 = 0.
This is a quadratic equation in x, with a = 5, b = -24, c = -5.
Employing the quadratic formula;
x = [-b+/-√(b²–4ac)]/(2a)
= {-(-24)+/-√[(-24)²–4*5*(-5)]}/(2*5)
= {24+/-√[576-(-100)]}/100
= (24+/-√676)/10
= (24+/-26))/10
= 50/10 or -2/10
= 5 or -1/5 = -0.2 .
So x = 5
Or x = -1/5 = -0.2 .
CHECK:
(i) If x =5:
Then (x+1)/(x-1)-(x-1)/(x+1)
= (5+1)/(5–1)-(5–1)/(5+1)
= 6/4–4/6
= 18/12-8/12
= (18–8)/12
= 10/12
= 5/6. ✓
(ii) If x = -1/5:
Then (x+1)/(x-1)-(x-1)/(x+1)
= (-1/5+1)/(-1/5–1)-(-1/5–1)/(-1/5+1)
= (4/5)/(-6/5)-(-6/5)/(4/5)
= (4/5)*(-5/6)-(-6/5)*(5/4)
= -(4*5)/(5*6)-[-(6*5)/(5*4)]
= -4/6-(-6/4)
= -4/6+6/4
= 6/4-4/6
= 18/12–8/12
= (18–8)/12
= 10/12
= 5/6. ✓
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