Let g(t)=t−3t−9. Make two tables, one showing values of g for t=8.9,8.99, and 8.999 and one showing values of g for t=9.1,9.01, and 9.001.
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Identify the function g(t) = \frac{t-9}{\sqrt{t}-3}. This function is undefined at t = 9 because both the numerator and the denominator become zero, leading to an indeterminate form.
To understand the behavior of g(t) as t approaches 9, we will evaluate the function for values of t slightly less than 9 and slightly greater than 9.
Create the first table for values of t less than 9: Calculate g(t) for t = 8.9, 8.99, and 8.999. For each value, substitute t into the function and simplify to find g(t).
Create the second table for values of t greater than 9: Calculate g(t) for t = 9.1, 9.01, and 9.001. Again, substitute each value of t into the function and simplify to find g(t).
Analyze the results from both tables to observe the trend of g(t) as t approaches 9 from both sides. This will help in understanding the limit of g(t) as t approaches 9.
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