12-06-2014, 10:27 AM
Connell’s sequence ( OEIS A001614) starting at index N=1:
1, 2, 4, 5, 7, 9, 10, 12, 14, 16, 17, 19, 21, 23, 25, 26.....
For non-negative integer N input solve this equation
C = 2 * N – (IP( SQRT( 2 * N ) + 0.5 ) ► U ) + 0 * ( N – ( U * ( ( 6 * N + 1 ) – SQ( U ) ) / 6 ► V ) + SQ( N ) ► S ) * ( 2 * N + U ► D ) * ( N + V + SQ( N ) ► E )
for C. You will be prompted for values other than N, ignore these prompts with R/S.
eg
For N=999,528
The calculator returns
C=1,997,642.
In variable S you find the sum of the first 999,258 terms
S=998,115,080,475
In variable D the Nth number NOT in the Connell sequence
D=2,000,470
& in variable E the sum of the first N numbers NOT in the Connell sequence
E=999,999,364,149
1, 2, 4, 5, 7, 9, 10, 12, 14, 16, 17, 19, 21, 23, 25, 26.....
For non-negative integer N input solve this equation
C = 2 * N – (IP( SQRT( 2 * N ) + 0.5 ) ► U ) + 0 * ( N – ( U * ( ( 6 * N + 1 ) – SQ( U ) ) / 6 ► V ) + SQ( N ) ► S ) * ( 2 * N + U ► D ) * ( N + V + SQ( N ) ► E )
for C. You will be prompted for values other than N, ignore these prompts with R/S.
eg
For N=999,528
The calculator returns
C=1,997,642.
In variable S you find the sum of the first 999,258 terms
S=998,115,080,475
In variable D the Nth number NOT in the Connell sequence
D=2,000,470
& in variable E the sum of the first N numbers NOT in the Connell sequence
E=999,999,364,149