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@@ -196,7 +196,9 @@ Therefore, the limit of the function as x approaches infinity is infinity. We ca
 
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-The given function is a rational function of the form f(x)=cxm+fxm−1+...+gx+haxn+bxn−1+...+dx+e , where n > m. As x approaches infinity, the highest power of x in the numerator dominates the value of the numerator, and the highest power of x in the denominator dominates the value of the denominator.  This means that we can ignore all the lower-order terms, and simply consider the behavior of the highest-order terms.
+The given function is a rational function of the form $$f(x)=cxm+fxm−1+...+gx+haxn+bxn−1+...+dx+e$$
+
+, where n > m. As x approaches infinity, the highest power of x in the numerator dominates the value of the numerator, and the highest power of x in the denominator dominates the value of the denominator.  This means that we can ignore all the lower-order terms, and simply consider the behavior of the highest-order terms.
 
 In this case, the highest-order term in the numerator is 2x4, and the highest-order term in the denominator is x3.