Question #224505

Prove that 2n+1 > (n + 2) · sin(n) for all positive integers n.


1
Expert's answer
2021-08-10T08:51:59-0400
n>1=>2n>n+1=>2n+1>n+2n>1=>2n>n+1=>2n+1>n+2

1sinn,n>11\geq\sin n, n>1

Then


2n+1>(n+2)sinn,n>12n+1>(n+2)\cdot\sin n, n>1

n=1,2(1)+1>(1+2)sin(1),n=1, 2(1)+1>(1+2)\cdot\sin (1),

3>3sin(1)3>3\cdot\sin (1)

1>sin(1),True1>\sin (1), True

Therefore 2n+1>(n+2)sinn,2n+1>(n+2)\cdot\sin n, for all positive integers n.n.


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