Finding Limit of Sequences
a_n = (nsin(n))/(n^2+1)
sequence converges to 0 due to the squeeze theorem
sum_(k=4)^infty(e^(2n))/((n-2)!)
series converges absolutely due to the ratio test
sum_(k=1)^infty1/((k+6)(k+7))
s_n=n/(7n+49)
sum_(k=0)^infty((-3)^k(x)^k)/(sqrt(k+1))
radius = 1/3
Interval = (-1/3,1/3]
Find the linear approximating polynomial for the following function centered at the given point a. Find the quadratic approximating polynomial for the following function centered at the given point a. Use the polynomials to approximate the given quantity.
f(x) = -1/x, a = 1; approx: -1/0.92
p_1(x)=x-2
p_2(x)=-x^2+3x-3
approx-1.08
approx-1.0864
b_n=(n^2)/(n^3+1)
sequence converges to 0
sum_(k=1)^infty1/(k^2+1)
series converges due to the LCT
Suppose that you take 240 mg of an antibiotic every 4 hr. The half-life of the drug is 4 hr (the time it takes for half of the drug to be eliminated from your blood). Use infinite series to find the long-term (steady-state) amount of antibiotic in your blood exactly.
480 mg is the long-term amount of antibiotic in your blood
sum_(k=1)^infty((-1)^k)/(sqrt(n+1))
series conditionally converges