You are asking for the limit of a constant function.
The fact that
is a constant function means that, for every input x you give to the function, the answer is always 3. So, for example,
![f(1) = 3,\ f(-14) = 3,\ f(6) = 3,\ f(\pi) = 3,\ f\left(\dfrac{3}{7}\right) = 3,\ f(0) = 3,\ f(12) = 3](https://tex.z-dn.net/?f=%20f%281%29%20%3D%203%2C%5C%20f%28-14%29%20%3D%203%2C%5C%20f%286%29%20%3D%203%2C%5C%20f%28%5Cpi%29%20%3D%203%2C%5C%20f%5Cleft%28%5Cdfrac%7B3%7D%7B7%7D%5Cright%29%20%3D%203%2C%5C%20f%280%29%20%3D%203%2C%5C%20f%2812%29%20%3D%203)
And so on. The output doesn't depend on the input: it's always 3.
So, the limit you're asking for means: if my input approaches -3, what happens to the output? Well, we already know that the output doesn't depend on the input. So, the input can approach every value you want, but the answer will always be 3.
Answer:
SAs bro I really just need points to ask my question. PLEASE I am struggling so hard rn. be a real one
Answer:
6
Step-by-step explanation:
pp
Answer:
Step-by-step explanation:
I hope you dont have to show your work because I am not showing how you do all of those aha.
part 1:
1. p=72, a= 612
2. p=194, a= 32.5
3. p=300, a= 1500
4. p=221, a= 35
and um... I dont know how to do part two. sorry