⛓Sequence Increasing or Decreasing problem ! ! ! ! !

__________________
In this video you will learn how to show whether the given Sequence 2^n/(n+1)! increases or decreases.

0:22 Understanding the Sequence increase/decrease
1:13 Checking increase/decrease of the given Sequence - showing the (n+1)st term being smaller than the nth term - decreasing sequence

Related Videos to this topic:

Sequence n/(n+1): Convergence using Formal Definition

Sequence cosn/n^2: Convergence using Squeeze Theorem

Sequence (-1)^n · [(e^-n)/n]: Two Methods to Show Convergence to 0 (zero)

Sequence (3n^2-1)/(4n^2+1): Converges?

Sequence ln(2n+1)-ln(n): Converges?

Sequence n2^n/3^n: Converges?

Sequence (e^n+2)/[e^(2n)-1]: Converges?

Sequence ne^-n: Converges?

Sequence (-1)^n · [(n+2)/(3n-1)]: Converges?

Sequence n!/2^n: Converges?

Sequence e^n/n: Increases or Decreases?

Sequence (n+3)/(n+2): Increases or Decreases?

Sequence e^(1/n): Boundary Value

Sequence (1-6n)/(n+3): Boundary Value

Sequence sin(n^2)/(n+1): Boundary Value

Sequence (3n^2-2)/(n^2+1): Boundary Value
______________________