More Limits by Factorization: An Introduction to Calculus
<p><strong>In our </strong><a href="https://medium.com/@partialderivative/using-factorization-to-find-limits-an-introduction-to-calculus-cca10544cb20" rel="noopener"><strong>previous article</strong></a><strong>, we introduced the concept of limits by factorization and provided an intuitive yet rigorous explanation for the method.</strong></p>
<p>You’ve already seen an example in our last article. Let’s continue discussing limits by factorization and rationalization:</p>
<p>Many limits cannot be found via direct substitution because they lead to the indeterminate form, so when finding limits, we revert back to an algebraic way of problem solving seen in Algebra.</p>
<p>Let’s try a similar example. Take a look at the expression:</p>
<p><a href="https://medium.com/@partialderivative/more-limits-by-factorization-an-introduction-to-calculus-d875044294fa"><strong>Visit Now</strong></a></p>