If the function f : R defined by , is surjective, then A is equal to :
R - (- 1, 0)
R - [- 1, 0)
- {- 1}
Let , where function satisfies f(x + y) = f(x)f(y) for all natural numbers x, y and f(1) = 2 . Then the natural number ‘a’ is
16
22
20
25
If f(1) = 10, f(2) = 14, then using Newton's forward formula f(1.3) is equal to
12.2
11.2
10.2
15.2
The positive root of x2 - 78.8 = 0 after first approximation by Newton Raphson method assuming initial approximation to the root is 14, is
9.821
9.814
9.715
9.915
For the circuit show below, the Boolean polynomial is
D.
Hence, option (d) is correct.