" Q."3.4quad alpha''" ? "alpha=(2ma)/(beta)log(1+(2 beta ell)/(ma))" gri "m=xi q,a=420L

An unknown quantity ''alpha'' is expressed as alpha = (2ma)/(beta) log(1+(2betal)/(ma)) where m = mass, a = acceleration l = length, The unit of alpha should be

An unknown quantity ''alpha'' is expressed as alpha = (2ma)/(beta) log(1+(2betal)/(ma)) where m = mass, a = acceleration l = length, The unit of alpha should be

Dimensions of an unknown quantity , phi = (ma)/(alpha) log (1 +(alpha l)/(ma)) where m = mass, a= acceleration and l = "length" are

If alpha and beta are the roots of the equation x^(2) - p(x + 1) - q = 0 , then the value of : (alpha^(2) + 2 alpha + 1)/(alpha^(2)+ 2 alpha + q) + (beta^(2) + 2 beta + 1)/(beta^(2) + 2 beta + q) is :

If alpha, beta are the roots of x^(2) - px + q = 0 and alpha', beta' are the roots of x^(2) - p' x + q' = 0 , then the value of (alpha - alpha')^(2) + (beta -alpha')^(2) + (alpha - beta')^(2) + (beta - beta')^(2) is

Let p and q be real numbers such that p ne 0 , p^(3) ne q and p^(3) ne - q. if alpha and beta are non-zero complex numbers satisfying alpha + beta = -p and alpha^(3) + beta^(3) = q, then a quadratic equation having (alpha)/(beta ) and (beta)/(alpha) as its roots is :

Let p and q be real number such that p ne 0 , p^(3) ne q and p^(3) ne -q . If alpha and beta non- zero complex number satifying alpha+ beta= -p and alpha^(3) + beta^(3) =q then a quadratic equation having (alpha)/(beta) and (beta) /(alpha) as its roots is :

If alpha , beta are the roots of the equation x^(2)-px+q=0 , then (alpha^(2))/(beta^(2))+(beta^(2))/(alpha^(2)) is equal to :

If alpha , beta are the roots of the equation x^(2)-px+q=0 , then (alpha^(2))/(beta^(2))+(beta^(2))/(alpha^(2)) is equal to :

Q.Let p and q real number such that p!=0p^(2)!=q and p^(2)!=-q. if alpha and beta are non-zero complex number satisfying alpha+beta=-p and alpha^(3)+beta^(3)=q then a quadratic equation having (alpha)/(beta) and (beta)/(alpha) as its roots is