- #1
dekoi
1.) lim x --> 1(left) (x^2 + |x| -2)/(|1-x|)
Since the limit is from the left, i made all absolute values pnegative, therefore numerator = x^2 - x - 2, and similarly denom. = (x-1). Then, by inspection, the limit would equal to + infinite.
2.) Find numbers a and c such that lim x --> 0 x/(sqrt(ax + c) -3) = 2
Multiplying first by the conjugate, and then assuming a value for either a or c (in my case, i let c = 9). Then, solving for a, i got 3. Is this assumption allowed/necessary?
3.) lim (x-->0) f(x^2)/x^2, where f(0)=0 and f'(0)=3.
No idea.
4.) Evaluate f'(P), where f(P) = tan(3P + sinP))
No idea.
5.) Prove: If lim x--> 6 f(x)g(x) exists, then limit must be f(6)g(6).
6.) Prove: If f is continuous at 5 and f(5)=2 and f(4)=3, then lim x-->2f(4x^2 - 11) =2
Thank you for absolutely any input. These are only a selected few (out of very many) that i was unsuccessful at solving.
Thank you again.
Since the limit is from the left, i made all absolute values pnegative, therefore numerator = x^2 - x - 2, and similarly denom. = (x-1). Then, by inspection, the limit would equal to + infinite.
2.) Find numbers a and c such that lim x --> 0 x/(sqrt(ax + c) -3) = 2
Multiplying first by the conjugate, and then assuming a value for either a or c (in my case, i let c = 9). Then, solving for a, i got 3. Is this assumption allowed/necessary?
3.) lim (x-->0) f(x^2)/x^2, where f(0)=0 and f'(0)=3.
No idea.
4.) Evaluate f'(P), where f(P) = tan(3P + sinP))
No idea.
5.) Prove: If lim x--> 6 f(x)g(x) exists, then limit must be f(6)g(6).
6.) Prove: If f is continuous at 5 and f(5)=2 and f(4)=3, then lim x-->2f(4x^2 - 11) =2
Thank you for absolutely any input. These are only a selected few (out of very many) that i was unsuccessful at solving.
Thank you again.