(i) 2x2−7x+3=0
We know;
D = b2–4ac
= −72–4×2×3
= 49−24
= 25
Since, D>0, hence roots are possible for this equation.
⇒2x2−7x=−3
On dividing both sides of the equation by 2, we get
⇒x2−7x2=−32
⇒x2−2×x×74=−32
On adding (74)2 to both sides of equation, we get
⇒(x)2−2×x×74+(74)2=(74)2−32
⇒(x−74)2=4916−32
⇒(x−74)2=2516
⇒(x−74)=±54
⇒x=74±54
⇒x=74+54 or x=74−54
⇒x=124 or x=24
⇒x=3 or 12