मान लीजिए कि a_{1}, a_{2}, dots, a_{n} निश्चि | vedclass

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दिया गया फलन $f(x) = (x - a_{1})(x - a_{2}) \dots (x - a_{n})$ है।$\lim_{x 	o a_{1}} f(x) = \lim_{x 	o a_{1}} [(x - a_{1})(x - a_{2}) \dots (x - a_{

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दिया गया फलन $f(x) = (x - a_{1})(x - a_{2}) \dots (x - a_{n})$ है।$\lim_{x 	o a_{1}} f(x) = \lim_{x 	o a_{1}} [(x - a_{1})(x - a_{2}) \dots (x - a_{n})]$$= (a_{1} - a_{1})(a_{1} - a_{2}) \dots (a_{1} - a_{n}) = 0 	imes (a_{1} - a_{2}) \dots (a_{1} - a_{n}) = 0$.अतः,$\lim_{x 	o a_{1}} f(x) = 0$.अब,$a 
eq a_{1}, a_{2}, \dots, a_{n}$ के लिए,$\lim_{x 	o a} f(x) = \lim_{x 	o a} [(x - a_{1})(x - a_{2}) \dots (x - a_{n})]$$= (a - a_{1})(a - a_{2}) \dots (a - a_{n})$.अतः,$\lim_{x 	o a} f(x) = (a - a_{1})(a - a_{2}) \dots (a - a_{n})$.

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