The identify element of `{({:(x,x),(x,x):})} x in R, x ne 0}` under matrix multiplication is

(i) Let M={({:(x,x),(x,x):}):x in R -{0}} and let ** be the matrix multiplication. Determine whether M is closed under ** . If so, examinie the existence of identity, existence of inverse properties for the operation ** on M.

Let M={[{:(,x,x),(,x,x):}}: x in R-{0}} and let * be the matrix multiplication. Determine whether M is closed under *. If so, examine the commutative and associative properties satisfied by * on M.

The identify element in the group {R -{1}, x} where a ** b = a+b-ab is

Let f(x+(1)/(x) ) =x^2 +(1)/(x^2) , x ne 0, then f(x) =?

Solve : (|x|-1)/(|x| - 3) ge 0, x in RR, x ne pm 3 .

The range of f(x) = ( x-3)/( 3-x), x ne 3 is

Find the roots of the polynomial equation (x + 2)^(3) (x - 1)^(2) (x+1) = 0 and state their multiplicity

If the roots of the equation (1)/(x+p)+(1)/(x+q)=(1)/(r ),(x ne -p, x ne -q, r ne 0) are equal in magnitude but opposite in sign, then p+q is equal to

Let M={[{:(,x,x),(,x,x):}}: x in R-{0}} and let * be the matrix multiplication. Determine whether M is closed under *. If so, examine the existence of identify, existence of inverse properties for the operation * on M.

Let a function f be defined by f(x)=(x-|x|)/x for x ne 0 and f(0)=2. Then f is