The Hofstadter Q sequence is defined as:

$Q(1)=Q(2)=1, \\ Q(n)=Q\big(n-Q(n-1)\big)+Q\big(n-Q(n-2)), \quad n>2.$

It is defined like the Fibonacci sequence, but whereas the next term in the Fibonacci sequence is the sum of the previous two terms, in the Q sequence the previous two terms tell you how far to go back in the Q sequence to find the two numbers to sum to make the next term of the sequence.

Task: Implement the Hofstadter Q Sequence equation into JavaScript

```yml tests: - text: hofstadterQ is a function. testString: 'assert(typeof hofstadterQ === ''function'', ''hofstadterQ is a function.'');' - text: hofstadterQ() should return integer testString: 'assert(Number.isInteger(hofstadterQ(1000)), ''hofstadterQ() should return integer'');' - text: hofstadterQ(1000) should return 502 testString: 'assert.equal(hofstadterQ(testCase[0]), res[0], ''hofstadterQ(1000) should return 502'');' - text: hofstadterQ(1500) should return 755 testString: 'assert.equal(hofstadterQ(testCase[1]), res[1], ''hofstadterQ(1500) should return 755'');' - text: hofstadterQ(2000) should return 1005 testString: 'assert.equal(hofstadterQ(testCase[2]), res[2], ''hofstadterQ(2000) should return 1005'');' - text: hofstadterQ(2500) should return 1261 testString: 'assert.equal(hofstadterQ(testCase[3]), res[3], ''hofstadterQ(2500) should return 1261'');' ```

```js function hofstadterQ (n) { // Good luck! return n; } ```

### After Test

```js console.info('after the test'); ```

```js function hofstadterQ (n) { const memo = [1, 1, 1]; const Q = function (i) { let result = memo[i]; if (typeof result !== 'number') { result = Q(i - Q(i - 1)) + Q(i - Q(i - 2)); memo[i] = result; } return result; }; return Q(n); } ```