Hi, The general form of the quadratic equation is Your equation is or If we think of the "a", "b" and "c" as placeholders, we should be able to see your equation as a quadratic with for "a", for "b" and for "c" And we can substitute these into the quadratic formula, giving us Now we just simplify as much as possible (Note NormallyBut since must be positive, no matter whatPx^ {2}qx^ {2}\left (pxqx\right)2q=0 p x 2 − q x 2 − ( p x q x) 2 q = 0 To find the opposite of pxqx, find the opposite of each term To find the opposite of p x q x, find the opposite of each term px^ {2}qx^ {2}pxqx2q=0 p x 2 − q x 2 − p x − q x 2 q = 0 Add qx^ {2} to both sides p 2 x 2 (p 2q 2)xq 2 =0 D=b24ac =(p 2q 2)2 4p2 x q2 =p4q42p2q2 4p2q2 =p4q42p2q2 =(p2q2)2 we know x= b undr root D/2a =p2q2p2q2/2p2 =2q2/2p2 =q2/p2 also x=b undr root D/2a =p2q2p2q2/2p2 = 2p2/2p2 =1
Using Shridhar Acharya Formula Solve The Following Quadratic Equations P 2x 2 P 2 Q 2 X Q 2 0 Sarthaks Econnect Largest Online Education Community
