Question

Let \[ f(x)=\left\{\begin{array}{ll} -x+b, & \text { if } z<3 \\ 5, & \text { if } z=3 \\ \frac{-x}{x-6}+0, & \text { if } z>3(\text { and } x \neq b) \end{array}\right. \] (a) For what value(s) of \( b \) is \( f \) continuous at 3 ? Answer: \( b= \) \( \square \) (b) For what value(s) of ib does \( f \) have a removable discontinuity at 3 ? Answer: \( b= \) \( \square \) (c) For what value(s) of \( b \) does \( f \) have an iedirite discontinuity at 3 ? Answer: \( b= \) \( \square \) (d) For what value(s) of b does \( f \) have a jump discontinuity at 3 ? Witte your answer in interval notation using "U* for union. For example, \( (-1,1) \cup(2,3) \) is the set of all real numbers \( x \) so that \( -1<x<1 \) or \( 2<x \leq 3 \). Answer: \( b \) is in the set \( \square \) Hint: use a process of elimination to consider all of the possible behaviours that the function could have at \( x=3 \).

          Let
\[
f(x)=\left\{\begin{array}{ll}
-x+b, & \text { if } z<3 \\
5, & \text { if } z=3 \\
\frac{-x}{x-6}+0, & \text { if } z>3(\text { and } x \neq b)
\end{array}\right.
\]
(a) For what value(s) of \( b \) is \( f \) continuous at 3 ?

Answer: \( b= \) \( \square \)
(b) For what value(s) of ib does \( f \) have a removable discontinuity at 3 ?

Answer: \( b= \) \( \square \)
(c) For what value(s) of \( b \) does \( f \) have an iedirite discontinuity at 3 ?

Answer: \( b= \) \( \square \)
(d) For what value(s) of b does \( f \) have a jump discontinuity at 3 ?

Witte your answer in interval notation using "U* for union.
For example, \( (-1,1) \cup(2,3) \) is the set of all real numbers \( x \) so that \( -1<x<1 \) or \( 2<x \leq 3 \).
Answer: \( b \) is in the set \( \square \)
Hint: use a process of elimination to consider all of the possible behaviours that the function could have at \( x=3 \).

Let

f(x)={
-x+b, if z<3

5, if z=3
(-x)/(x-6)+0, if z>3( and x ≠ b)
.

(a) For what value(s) of b is f continuous at 3 ?

Answer: b= □
(b) For what value(s) of ib does f have a removable discontinuity at 3 ?

Answer: b= □
(c) For what value(s) of b does f have an iedirite discontinuity at 3 ?

Answer: b= □
(d) For what value(s) of b does f have a jump discontinuity at 3 ?

Witte your answer in interval notation using "U* for union.
For example, (-1,1) ∪(2,3) is the set of all real numbers x so that -1<x<1 or 2<x ≤ 3.
Answer: b is in the set □
Hint: use a process of elimination to consider all of the possible behaviours that the function could have at x=3.

Added by Brandon S.

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