Practice Questions – Algebraic expressions and identities – Class VIII

The number of like terms in \(abc,-abc,-bca,acb,bac,\frac{1}{2}cab \) is

The coefficient of \(x^2y \) in \( 7\ pqr\ x^2y\) is

The sum of \(x^2-y^2,\ y^2-z^2 \) and \(z^2-x^2 \) is

\((x-y)\ (x+y)+(y-z)\ (y+z)+(z-x)\ (z+x)= \)

If we add \(7xy+5yz-3zx,4yz+9zx-4y \) and \(-3xz+5x-2xy \), then the answer is

If we subtract \(4a – 7ab + 3b + 12\) from \(12a – 9ab + 5b – 3\), then the answer is:

The degree of the polynomial \( 7x^2yz^2+6x^3y^2z^2-5x+8y\) is

\( \dfrac{7}{5}xy-\dfrac{2}{3}xy+\dfrac{8}{9}xy=\)

\(3m\times(2m^2-5mn+4n^2)= \)

Volume of a rectangular box whose adjacent edges are \(3x^2y,4y^2z,5z^2x \) is

If \(x+\dfrac{1}{x}=2 \) then \(x^2+\dfrac{1}{x^2}= \)

If \(x^2+y^2=9 \) and \(xy=8 \) then \(x+y= \)

\((102)^2-(98)^2= \)

\(-50\ x^3y^2z^2 \) divided by \(-5xyz \) is equal to

If area of a rectangle is \(24(x^2yz+xy^2z+xyz^2) \) and length is \(8\ xyz \), its breadth is

If \(x=3 \) is a solution of \( x^2+Kx+15\), the value of \(K \) is