Lim X → 1 √ 5 X − 4 − √ X X 3 − 1 - Mathematics

प्रश्न

\[\lim_{x \to 1} \frac{\sqrt{5x - 4} - \sqrt{x}}{x^3 - 1}\]

उत्तर

\[\lim_{x \to 1} \left[ \frac{\sqrt{5x - 4} - \sqrt{x}}{x^3 - 1} \right]\] It is of the form \[\frac{0}{0}\]

Rationalising the numerator:

\[\lim_{x \to 1} \left[ \frac{\left( \sqrt{5x - 4} - \sqrt{x} \right) \left( \sqrt{5x - 4} + \sqrt{x} \right)}{\left( x^3 - 1 \right) \left( \sqrt{5x - 4} + \sqrt{x} \right)} \right]\]

= \[\lim_{x \to 1} \left[ \frac{5x - 4 - x}{\left( x - 1 \right)\left( x^2 + x + 1 \right)\left( \sqrt{5x - 4} + \sqrt{x} \right)} \right]\]

= \[\lim_{x \to 1} \left[ \frac{4\left( x - 1 \right)}{\left( x - 1 \right)\left( x^2 + x + 1 \right)\left( \sqrt{5x - 4} + \sqrt{x} \right)} \right]\]

= \[\frac{4}{3\left( 1 + 1 \right)}\]

= \[\frac{2}{3}\]

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Concept of Limits - Limits of Polynomials and Rational Functions

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Q 18 Q 17 Q 19

अध्याय 29: Limits - Exercise 29.4 [पृष्ठ २८]

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अध्याय 29 Limits
Exercise 29.4 | Q 18 | पृष्ठ २८

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Concept of Limits - Limits of Polynomials and Rational Functions

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Lim X → 1 √ 5 X − 4 − √ X X 3 − 1 - Mathematics

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