Choose the Correct options
0 of 16 Questions completed
Questions:
You have already completed the quiz before. Hence you can not start it again.
Quiz is loading…
You must sign in or sign up to start the quiz.
You must first complete the following:
0 of 16 Questions answered correctly
Your time:
Time has elapsed
You have reached 0 of 0 point(s), (0)
Earned Point(s): 0 of 0, (0)
0 Essay(s) Pending (Possible Point(s): 0)
Average score |
|
Your score |
|
The number of like terms in \(abc,-abc,-bca,acb,bac,\frac{1}{2}cab \) is
All are like terms
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
Breadth
If \(x=3 \) is a solution of \( x^2+Kx+15\), the value of \(K \) is