SOLUTION: Suppose a function "f" is defined on an interval around x=c, but possibly not at the point x=c itself. Suppose that as x becomes sufficiently close to c, f(x) becomes as close to a
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-> SOLUTION: Suppose a function "f" is defined on an interval around x=c, but possibly not at the point x=c itself. Suppose that as x becomes sufficiently close to c, f(x) becomes as close to a
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Question 149338: Suppose a function "f" is defined on an interval around x=c, but possibly not at the point x=c itself. Suppose that as x becomes sufficiently close to c, f(x) becomes as close to a single number "L" as we please. We then say that limit of f(x) as x approches c is "L", and we write
lim f(x)=L
x -> c
apply this definition to the function from above to find lim f(x)
x->2
use the graph to find lim g(x), where g is defined as g(x)= {1, x dose not = 2}
{0, x=2 } Answer by stanbon(75887) (Show Source):
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