Q1) \({x^2 +3x-28}\over{x-4}\) = [ \(x+7\) ]

Q1) \({x^2 -4}\over{x-2}\) = [ \(x+2\) ]

Q1) \({4x^2 -26x+30}\over{x-5}\) = [ \(4x-6\) ]

Q2) \({x^2 -11x+24}\over{x-8}\) = [ \(x-3\) ]

Q2) \({x+3}\over{x^2 -9}\) = [ \(1\over{x-3}\) ]

Q2) \({2x^2 -18}\over{x-3}\) = [ \(2x+6\) ]

Q3) \({x^2 +12x+35}\over{x+7}\) = [ \(x+5\) ]

Q3) \({x-2}\over{x^2 -4}\) = [ \(1\over{x+2}\) ]

Q3) \({5x^2 +12x+4}\over{x+2}\) = [ \(5x+2\) ]

Q4) \({x+5\over{x^2 +7x+10}}\) = [ \(1\over{x+2}\) ]

Q4) \({x^2 -16}\over{x+4}\) = [ \(x-4\) ]

Q4) \({3x^2 +24x+36}\over{x+6}\) = [ \(3x+6\) ]

Q5) \({x+2\over{x^2 -4x-12}}\) = [ \(1\over{x-6}\) ]

Q5) \({x+4}\over{x^2 -16}\) = [ \(1\over{x-4}\) ]

Q5) \({5x^2 -26x+24}\over{x-4}\) = [ \(5x-6\) ]

Q6) \({x^2 +2x-8}\over{x-2}\) = [ \(x+4\) ]

Q6) \({x-3}\over{x^2 -9}\) = [ \(1\over{x+3}\) ]

Q6) \({2x^2 +15x+25}\over{x+5}\) = [ \(2x+5\) ]

Q7) \({x-8\over{x^2 -5x-24}}\) = [ \(1\over{x+3}\) ]

Q7) \({x-5}\over{x^2 -25}\) = [ \(1\over{x+5}\) ]

Q7) \({3x^2 -7x-20}\over{x-4}\) = [ \(3x+5\) ]

Q8) \({x-2\over{x^2 -5x+6}}\) = [ \(1\over{x-3}\) ]

Q8) \({x^2 -9}\over{x+3}\) = [ \(x-3\) ]

Q8) \({5x^2 -27x+10}\over{x-5}\) = [ \(5x-2\) ]

Q9) \({x^2 -x-6}\over{x+2}\) = [ \(x-3\) ]

Q9) \({x^2 -25}\over{x+5}\) = [ \(x-5\) ]

Q9) \({2x^2 -17x+30}\over{x-6}\) = [ \(2x-5\) ]

Q10) \({x^2 +9x+20}\over{x+5}\) = [ \(x+4\) ]

Q10) \({x^2 -9}\over{x-3}\) = [ \(x+3\) ]

Q10) \({4x^2 -20x+16}\over{x-4}\) = [ \(4x-4\) ]