Q1) \(8 \over 4 x \) + \( 4\over x \) = 6 [ x = 1]
Q1) \( x \over 6 \) + \( x \over 2 \) = 4 [ x = 6]
Q1) \( -6 \over x + 1 \) + \( 12 \over x +2 \) = 1 [ x = 2 , x = 1]
Q2) \(9 \over x \) + \( 6\over 2 x \) = 4 [ x = 3]
Q2) \( x \over 6 \) + \( x \over 3 \) = 5 [ x = 10]
Q2) \( -6 \over x + 1 \) + \( 72 \over x +12 \) = 11 [ x = -3 , x = -4]
Q3) \(9 \over 3 x \) + \( 7\over x \) = 2 [ x = 5]
Q3) \( x \over 6 \) + \( x \over 9 \) = 5 [ x = 18]
Q3) \( 4 \over x + 1 \) + \( 24 \over x -6 \) = -7 [ x = 3 , x = -2]
Q4) \(9 \over 3 x \) + \( 7\over x \) = 10 [ x = 1]
Q4) \( x \over 2 \) + \( x \over 4 \) = 3 [ x = 4]
Q4) \( 3 \over x + 1 \) + \( 12 \over x -4 \) = -5 [ x = 2 , x = -2]
Q5) \(10 \over x \) + \( 10\over 5 x \) = 3 [ x = 4]
Q5) \( x \over 10 \) + \( x \over 5 \) = 3 [ x = 10]
Q5) \( -2 \over x + 1 \) + \( 12 \over x +6 \) = 5 [ x = -3 , x = -2]
Q6) \(10 \over 5 x \) + \( 7\over x \) = 3 [ x = 3]
Q6) \( x \over 8 \) + \( x \over 4 \) = 3 [ x = 8]
Q6) \( 12 \over x + 1 \) + \( 144 \over x -12 \) = -13 [ x = -4 , x = 3]
Q7) \(5 \over x \) + \( 8\over 4 x \) = 7 [ x = 1]
Q7) \( x \over 3 \) + \( x \over 2 \) = 5 [ x = 6]
Q7) \( 8 \over x + 1 \) + \( 72 \over x -9 \) = -10 [ x = 3 , x = -3]
Q8) \(10 \over 2 x \) + \( 3\over x \) = 4 [ x = 2]
Q8) \( x \over 10 \) + \( x \over 6 \) = 4 [ x = 15]
Q8) \( 15 \over x + 1 \) + \( 240 \over x -16 \) = -17 [ x = 4 , x = -4]
Q9) \(5 \over x \) + \( 8\over 2 x \) = 3 [ x = 3]
Q9) \( x \over 9 \) + \( x \over 3 \) = 4 [ x = 9]
Q9) \( -20 \over x + 1 \) + \( 240 \over x +12 \) = 11 [ x = 3 , x = 4]
Q10) \(6 \over x \) + \( 4\over 2 x \) = 8 [ x = 1]
Q10) \( x \over 6 \) + \( x \over 2 \) = 2 [ x = 3]
Q10) \( 9 \over x + 1 \) + \( 72 \over x -8 \) = -9 [ x = 2 , x = -4]