According to Wittgenstein's Finite Rule Paradox every finite sequence of numbers can be a described in infinitely many ways and so can be continued any of these ways - some simple, some complicated but all equally valid. Conversely, it is possible to find a rule such that any number of your choice can be the next one.
One polynomial solution is
T(n) = 0.5*(n3 + 3*n2 + 38*n + 120) for n 1, 2, 3, ...
108 = 75% of 144
36 is the largest positive integer that divides into both 108 and 144 evenly with no remainder.
L C M of 108 and 144 2×2×3×3×3×4 Ans is 432
36, 72, 108, 144, 180 and so on.
18
y = 144/(2n-1) where n is the term in the sequence and y is the number.
108 = 75% of 144
If you mean 108" (inches) x 144", it's 108 square feet. 108" = 9' (feet); 144" = 12'. 9 x 12 = 108.
The greatest common factor of 108 and 144 is 36.
108
36, 72, 108, 144, 18036, 72, 108, 144, 180
36 is the largest positive integer that divides into both 108 and 144 evenly with no remainder.
the answer is 144
144%
108.
108
The greatest common factor of 144, 108, 27 is 9.