The first five consecutive powers of 101 produce
palindromes. The next 4 consecutive powers of 101
produce 'quasipalindromes' in the sense of
concatenating several multidigit numbers in reverse
order, but not reversing the digits of those individual
numbers. In all these powers the numbers in the rows
of Pascal's Triangle can be seen in order (with some
zeros thrown in here and there so that each number,
after the first, occupies a twodigit space), hence the
name 'Pascalindromes'.

101^{0} = 1
101^{1} = 101
101^{2} = 10201
101^{3} = 1030301
101^{4} = 104060401
101^{5} = 10510100501
101^{6} = 1061520150601
101^{7} = 107213535210701
101^{8} = 10828567056280801
