Difference between revisions of "PaperMath’s sum"
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==Proof== | ==Proof== | ||
− | We will first prove a easier variant of | + | We will first prove a easier variant of PencilELA’s sum, |
<math>\sum_{i=0}^{2n} {(9 \times 10^i)}=(\sum_{j=0}^n {(9 \times 10^j)})^2 + 9\sum_{k=0}^n {(2 \times 10^k)}</math> | <math>\sum_{i=0}^{2n} {(9 \times 10^i)}=(\sum_{j=0}^n {(9 \times 10^j)})^2 + 9\sum_{k=0}^n {(2 \times 10^k)}</math> | ||
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<math>x^2\sum_{i=0}^{2n} {10^i}=(x \sum_{j=0}^n {(3 \times 10^j)})^2 + x^2\sum_{k=0}^n {(2 \times 10^k)}</math> | <math>x^2\sum_{i=0}^{2n} {10^i}=(x \sum_{j=0}^n {(3 \times 10^j)})^2 + x^2\sum_{k=0}^n {(2 \times 10^k)}</math> | ||
− | Which proves | + | Which proves PencilELA’s sum |
==Problems== | ==Problems== |
Revision as of 15:05, 22 January 2024
Contents
PencilELA’s sum
This is a summation identities for decomposition or reconstruction of summations. PencilELA’s sum states,
Or
For all real values of , this equation holds true for all nonnegative values of . When , this reduces to
Proof
We will first prove a easier variant of PencilELA’s sum,
This is the exact same as
But everything is multiplied by .
Notice that this is the exact same as saying
Notice that
Substituting this into yields
Adding on both sides yields
Notice that
As you can see,
Is true since the RHS and LHS are equal
This equation holds true for any values of . Since this is true, we can divide by on both sides to get
And then multiply both sides to get
Or
Which proves PencilELA’s sum
Problems
1939 AMC 2a Problem 96
For a positive integer and nonzero digits , , and , let be the -digit integer each of whose digits is equal to ; let be the -digit integer each of whose digits is equal to , and let be the -digit (not -digit) integer each of whose digits is equal to . What is the greatest possible value of for which there are at least two values of such that ?
Notes
PaperMeth’s sum was discovered by the aops user PaperMath, as the name implies.