Factorise : `p^(2)+2p-(q+1)(q-1)`

Factorise : p^(2)+p-(a+1)(a+2)

Factorise : 2a^(2)-3a-(p+1)(2p-1)

Factorise : a^(2)+(p+(1)/(p))a+1

Factorise : p(p-1)(p-2)(p-3)-120

Let alpha,beta be the roots of the equation x^(2)-px+r=0 and alpha//2,2beta be the roots of the equation x^(2)-qx+r=0 , then the value of r is (1) (2)/(9)(p-q)(2q-p) (2) (2)/(9)(q-p)(2p-q) (3) (2)/(9)(q-2p)(2q-p) (4) (2)/(9)(2p-q)(2q-p)

Factorise (Using factor theorem ) : p^(3)-3pq^(2)+2q^(3)

The Boolean Expression (p^^~ q)vvqvv(~ p^^q) is equivalent to : (1) ~ p^^q (2) p^^q (3) pvvq (4) pvv~ q

The Boolean expression ~(pvvq)vv(~p^^q) is equivalent to (1) ~p (2) p (3) q (4) ~q

The base B C of a A B C is bisected at the point (p ,q) & the equation to the side A B&A C are p x+q y=1 & q x+p y=1 . The equation of the median through A is: (p-2q)x+(q-2p)y+1=0 (p+q)(x+y)-2=0 (2p q-1)(p x+q y-1)=(p^2+q^2-1)(q x+p y-1) none of these

Let us factorise the following. p^4 - 2p^2q^2 - 15q^4