35. $lim_{x\rightarrow1^{+}}\frac{x^{2}-5x + 6}{x - 1}$

35. $lim_{x\rightarrow1^{+}}\frac{x^{2}-5x + 6}{x - 1}$

35. $lim_{x\rightarrow1^{+}}\frac{x^{2}-5x + 6}{x - 1}$

Answer

Explanation:

Step1: Factor the numerator

First, factor $x^{2}-5x + 6=(x - 2)(x - 3)$. So the limit becomes $\lim_{x\rightarrow1^{+}}\frac{(x - 2)(x - 3)}{x - 1}$.

Step2: Analyze the behavior as $x\rightarrow1^{+}$

As $x\rightarrow1^{+}$, $(x - 2)\rightarrow - 1$, $(x - 3)\rightarrow - 2$, and $(x - 1)\rightarrow0^{+}$. The product of $(x - 2)$ and $(x - 3)$ is $(-1)\times(-2)=2$. And since the denominator $x - 1$ approaches $0$ from the positive - side, $\frac{2}{x - 1}\rightarrow+\infty$.

Answer:

$+\infty$