Can you explain why lim x → ∞  A(t) exists for one of the functions but not the other?

Select the second function, y = 1x2, for 0 < x ≤ 5.(a) Observe the graph of A(t) = t1f(x) dx in the second diagram. Does it appear that lim x → ∞ A(t) exists?YesNo    (b) Change the maximum value of x to 100 and observe the graph of A(t) again. Does it appear that lim x → ∞  A(t) exists?YesNo    If so, estimate the value of the limit. (If an answer does not exist, enter DNE.)lim x → ∞  A(t) = (c) Find the values of A(1000), A(10,000), and A(100,000).A(1000)  =  A(10,000)  =  A(100,000)  =  (d) The graphs of the first two functions (from the pull-down menu) look very similar. Can you explain why lim x → ∞  A(t) exists for one of the functions but not the other?

Show mathematically that lim t → ∞  A(t) exists if p > 1 but does not exist if 0 < p < 1.

limx→∞exx

uppose a function is not defined at 0, for example f (x) = 1x , what does this tell us about limx→0 f (x)?

When evaluating a limit, what does it mean if the function approaches different values from the left and the right sides of the point?Group of answer choicesThe limit is equal to the average of the two valuesThe limit does not existThe limit approaches infinityThe limit is equal to the larger of the two values