- #1
Macleef
- 30
- 0
workerant said:Well if you plug the four in initially you get:
2-2/(3-3)=0/0
Your trick did not work nor does using the other radical as Mathdope suggests.
But, never fear, 0/0 limits call for one man...
L'Hopital!
Since it is indeterminate form, it is eligible for L'Hopital's rule. That should make it work.
A limit problem is a mathematical question that involves finding the value that a function approaches as its input approaches a certain value. It is used to understand the behavior of a function near a particular point.
Limit problems are important because they are used in many areas of mathematics and science, such as calculus, physics, and engineering. They help us understand how a function behaves and make predictions about its behavior.
To solve a limit problem, you need to use mathematical techniques such as substitution, factoring, and L'Hopital's rule. You also need to understand the properties of limits, such as the limit laws and the squeeze theorem.
There are three main types of limit problems: finite limits, infinite limits, and limits at infinity. Finite limits involve finding the value of a function at a specific point, infinite limits involve finding the behavior of a function as it approaches positive or negative infinity, and limits at infinity involve finding the behavior of a function as its input approaches infinity.
Limit problems are used in many real-life applications, such as calculating the velocity and acceleration of objects in motion, predicting population growth, and analyzing the behavior of electrical circuits. They are also used in economics, biology, and other fields.