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.

(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.

Let A be Q/{1}. Define * on A by x * y=x+y-xy. Is * binary on A? If so, examine the existence of identity & inverse properties for the operation * on A.

Let {(x ,(x^2)/(1+x^2)):x in R} be a function from R into R Determine the range of f .

Let A be Q/{1}. Define * on A by x * y=x+y-xy. Is * binary on A? If so, examine the commutative and association properties satisfied by * on A.

f(x)=x^x , x in (0,oo) and let g(x) be inverse of f(x) , then g(x)' must be

Let f={(x, x^2/(1+x^(2))), x in R} be a function from R into R. Determine the range of f.

Determine its order, degree (if exists) x=e^(xy((dy)/(dx)))