Infinite Limits and Vertical Asymptotes - Page 2
Questions
- For what values of x, if any, does #f(x) = 1/((12x+3)sin(pi+(6pi)/x) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = 1/((x-4)(x+8)) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = 1/(x^2-3x+4) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = 1/((x-9)(x-1)(x-5)) # have vertical asymptotes?
- How many vertical asymptotes can a graph have?
- For what values of x, if any, does #f(x) = cot((7pi)/12-x) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = 1/((x-6)(x^2-9)) # have vertical asymptotes?
- How do you find the limit of #1/(x^3 +4) # as x approaches infinity?
- For what values of x, if any, does #f(x) = 1/((x^2-4)cos(pi/2+(8pi)/x) # have vertical asymptotes?
- How do you find any asymptotes of #h(x)=(x-5)/(x^2+2x-4)#?
- For what values of x, if any, does #f(x) = 1/((5x+8)cos(pi/2-(12pi)/x) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = 1/((x-3)(x^2-27)) # have vertical asymptotes?
- For what values of x, if any, does #f(x) = tanx # have vertical asymptotes?
- For what values of x, if any, does #f(x) = tan((-7pi)/4-2x) # have vertical asymptotes?
- #lim x->oo# #e^x((2^(x^n))^(1/e^x)-(3^(x^n))^(1/e^x))/x^n# , n belongs to N, is equal to ?
- How do you find the limit of #sqrt(x^2+2x)+x# as x approaches infinity?
- How do you find the limit of #((e^x)-x)^(2/x)# as x approaches infinity?
- How do you find the limit of #sqrt(9x^2 +x)-(3x)# as x approaches infinity?
- How do you find the limit of #(x+x^3-x^5)/(1-x^2-x^4)# as x approaches infinity?
- Is this limit true or false #lim 1/x^2=-oo# as #x->0#?