It is possible if the index of a radical number is even and its radicand is negative.Answer:1For any number a, lim1aAnswer:If q (x) = 0 in f (x) =p(x)we say that lim f (x) does not exist.9(x)Answer:- Suppose n is a positive integer and lim f (x) = L. Then%3Dlim f (x)lim f (x)= L provided that L > 0 when n is even.%3DAnswer: BASIClim x - 4 = 8X-4Answer:

Name: It is possible if the index of a radical number is even and its radic
Uploaded: 2024-03-20T06:38:44.000Z
Channel: Bartleby
Description: It is possible if the index of a radical number is even and its radicand is negative.Answer:1For any number a, lim1aAnswer:If q (x) = 0 in f (x) =p(x)we say that lim f (x) does not exist.9(x)Answer:- Suppose n is a positive integer and lim f (x) = L