" 28.If "(x+a)" is the factor of "x^(2)+...

" 28.If "(x+a)" is the factor of "x^(2)+px+q" and "x^(2)+mx+n." Prove that "a=(n-q)/(m-p)

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if x+a is a factor of the polynomials x^(2)+px+q and x^(2)+mx+n prove that a=(n-q)/(m-p)

If x+a is a factor of x^2+px+q and x^2+mx+n , show that a= (n-q)/(m-p) .

If (x+a) is a factor of the polynomials x^(2)+px+q=0 and x^(2)+mx+n=0 prove a=(n-q)/(m-p)

.If (x-p) is the factor of x^(3)-mx^(2)-2npx+np^(2) ,prove that p=m+n;p!=0

If x+a is a common factor of expression f(x)=x^(2)+px+q and g(x)=x^(2)+mx+n , show that a=(n-q)/(m-p) .

If (x+a) is the factor of the polynomials (x^(2)+px+q) and (x^(2)+mx+n) , then the value of 'a' is

If x ^(2) -3x+2 is a factor of x ^(4) -px ^(2) +q=0, then p+q=

If x ^(2) -3x+2 is a factor of x ^(4) -px ^(2) +q=0, then p+q=

If (x-1) is the factors fo polynomial x^3-px+q , then prove that p-q=1

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