| a4 |
| a2 |
∴q=2,a1=
| a2 |
| q |
因此
| lgan+1+lgan+2+…+lga2n |
| n |
| lg2n+1+lg2n+2+…+lg22n |
| n2 |
=
| [(n+1)+(n+2)+…+2n] |
| n2 |
=
| 3n2+n |
| 2n2 |
原式=
| lim |
| n→∞ |
| 3n2+n |
| 2n2 |
| lim |
| n→∞ |
| 3n2+n |
| 2n2 |
| 3 |
| 2 |
| lim |
| n→∞ |
| lgan+1+lgan+2+…+lga2n |
| n |
| a4 |
| a2 |
| a2 |
| q |
| lgan+1+lgan+2+…+lga2n |
| n |
| lg2n+1+lg2n+2+…+lg22n |
| n2 |
| [(n+1)+(n+2)+…+2n] |
| n2 |
| 3n2+n |
| 2n2 |
| lim |
| n→∞ |
| 3n2+n |
| 2n2 |
| lim |
| n→∞ |
| 3n2+n |
| 2n2 |
| 3 |
| 2 |