Question

sketch the graph of t. does t have any discontinuities? explain why, if t had a jump discontinuity, it might be advantageous in some situations to earn less money.
further insights and challenges

1. if f has a removable discontinuity at x = c, then it is possible to redefine f(c) so that f is continuous at x = c. can this be done in more than one way? explain.
2. give an example of functions f and g such that f(g(x)) is continuous but g has at least one discontinuity.
3. continuous at only one point show that the following function is continuous only at x = 0:

f(x) = {x for x rational; -x for x irrational}

1. show that f is a discontinuous function for all x, where f(x) is defined as follows:

f(x) = {1 for x rational; -1 for x irrational}
show that f² is continuous for all x.

Explanation:

for 94: A removable discontinuity at \( x = c \) implies \( \lim_{x \to c} f(x) \) exists (unique \( L \)). To make \( f \) continuous at \( c \), \( f(c) \) must equal \( L \), so only one way to redefine \( f(c) \).

for 95: Choose \( g \) with a discontinuity and \( f \) continuous such that \( f(g(x)) \) is constant. Example: \( g(x) \) has a jump discontinuity, \( f(x) = x^2 \).

for 96: At \( x = 0 \), \( \lim_{x \to 0} f(x) = 0 = f(0) \). For \( x
eq 0 \), rational/irrational sequences have conflicting limits.

for 97: \( f \) has conflicting limits (1/-1) at any \( x \); \( f^2(x) = 1 \) (constant, continuous).

Answer:

for 94: No, it cannot be done in more than one way. A removable discontinuity at \( x = c \) requires \( \lim_{x \to c} f(x) = L \) (unique), so \( f(c) \) must equal \( L \) for continuity, leaving only one possible value for \( f(c) \).