AMC 10 · 2021 · #8

• From the picture, the spiral's corner pattern is clear: $1 = 1^2$ at the center, $9 = 3^2$ at the top-right of the $3 \times 3$ ring, $25 = 5^2$ at the top-right of the $5 \times 5$ ring.
• In general the top-right corner of ring $k$ (the $(2k-1) \times (2k-1)$ boundary around center) is $(2k-1)^2$.
• Verify: ring $4$ corner $= 7^2 = 49$, ring $5$ corner $= 81$, ..., ring $8$ corner $= 15^2 = 225$.

💡 Grade 4 patterns: the odd squares $1, 9, 25, 49, 81, 121, 169, 225$ sit at the spiral's outer-right corners.

• Use the $7 \times 7$ picture to learn the move-sequence from one corner to the next.
• From $9$ at $(\text{row } 7, \text{col } 7)$ in a $7 \times 7$ embedding centered at $(\text{row } 8, \text{col } 8)$ — sorry, in the figure $9$ corresponds to the corner of the inner $3 \times 3$ block.
• The next ring fills $10$ east, $11, 12, 13$ south, $14, 15, 16, 17$ west, $18, 19, 20, 21$ north, $22, 23, 24, 25$ east.
• So from corner $(2k-1)^2$ to corner $(2k+1)^2$ the moves are $1$ east, $2k-1$ south, $2k$ west, $2k$ north, $2k$ east — total $8k$ cells in the new ring.

💡 Grade 4 pattern rule: each ring's perimeter $= 8k$, matched by the move counts.

• Now zoom to the outer two rings of the $15 \times 15$.
• Ring $7$ is the $13 \times 13$ boundary; its corner $169 = 13^2$ sits at row $2$, column $14$ (one row above and one column left of the outer corner).
• Working backwards: the east-step that ends at $169$ began at row $2$, column $3$, with value $158$.
• So row $2$, columns $3$ to $14$, holds values $158, 159, \dots, 169$ in order (the top edge of ring $7$).

💡 Grade 5 numerical pattern: the east-step adds $1$ per column moved.

• Just before that east-step, the north-step (left column of ring $7$) ended at row $2$, column $2$.
• That step started at row $13$, column $2$ with value $146$ and ended with $146 + 11 = 157$ at row $2$, column $2$.
• So the row-$2$ entries inside ring $7$ are columns $2$ through $14$ holding $157, 158, \dots, 169$.

💡 Grade 3 sequential counting: each step in the spiral adds $1$ to the value.

• Now do ring $8$ (the outer $15 \times 15$ boundary).
• It begins at $170$ right after $169$.
• The first east-step lands $170$ at row $2$, column $15$ (one step east of $169$).
• The south-step then fills rows $3, 4, \dots, 15$ at column $15$ with values $171, 172, \dots, 183$.
• After the bottom (west) and left (north) edges, the north-step ends at row $1$, column $1$ with value $211$.
• So row $2$, column $1$ is one step before $211$, i.e., $210$.

💡 Grade 3 counting on: ring $8$ has $8 \cdot 8 = 64$ cells, $170$ through $225$, placed exactly along the four edges.

• Collect all of row $2$.
• Columns $1, 2, 3, \dots, 14, 15$ hold $210, 157, 158, 159, \dots, 169, 170$.
• The largest is $210$ (the outer-ring north-step neighbor of $211$) and the smallest is $157$ (the inner-ring north-step end).
• Sum: $210 + 157 = 367$.

💡 Grade 3 within-$1000$ addition: $210 + 157 = 367$ matches choice (A).