The least number of squares to be added in the figure to make AB a line of symmetry is
Consider two functions of time (t),
$$f(t)=0.01\,t^2$$
$$g(t)=4\,t$$
where $$0 < t < \infty$$.
Now consider the following two statements :
(i) For some $$t > 0,g(t) > f(t)$$.
(ii) There exists a $$T$$, such that $$f(t) > g(t)$$ for all $$t > T$$.
Which one of the following options is TRUE?
$$f(x)$$ and $$g(y)$$ are functions of x and y, respectively, and $$f(x)=g(y)$$ for all real values of x and y. Which one of the following options is necessarily TRUE for al x and y?
A box contains five balls of same size and shape. Three of them are green coloured balls and two of them are orange coloured balls. Balls are drawn from the box one at a time. If a green ball is drawn, it is not replaced. If an orange ball is drawn, it is replaced with another orange ball.
First ball is drawn. What is the probability of getting an orange ball in the next draw?