{"type":"firestarter.listing","listing":{"id":"lst_3GgJ90NL","product_name":"Epic Monster Card Pages, 30 Page Pack","category":"Accessory","description":"**Pages fitÂ mini-binders like the Forged Curiosities Cache**\nSIZE: Page size is 6 inches by 8 inches. Each 2-slot page is designed to fit 1 Epic D&amp;D Monster Card and 1 Standard-size card. The larger Epic pocket (5.25\" x 5\") holds an epic-size monster card and the smaller standard pocket (2.5 x 3.5) holds a standard-size card.\nPACKAGE QUANTITY: Package contains 30 pagesCOMPATIBILITY: Compatible with the Forged Gaming Curiosities Cache Monster Card Binder, but will fit most mini-binders and planners.QUALITY: Crystal clear and acid free archival-quality pages.","images":["https://cdn.shopify.com/s/files/1/1757/1411/products/EpicCardPagesMain.jpg?v=1746284139","https://cdn.shopify.com/s/files/1/1757/1411/products/InAlbum2.jpg?v=1746284139","https://cdn.shopify.com/s/files/1/1757/1411/products/MG_5741.jpg?v=1746284139"],"price":9.99,"currency":"USD","in_stock":true,"inventory_qty":9999,"dynamic_pricing":false,"listed_at":"2026-06-18T20:47:12.192Z"},"share_url":"https://firestarter.network/l/lst_3GgJ90NL","purchase":{"summary":"Live product listing on the Firestarter agent commerce network. Purchases run through your agent, not a human checkout page.","mcp":{"url":"https://api.firestarter.network/mcp","transport":"streamable-http","auth":"Authorization: Bearer <your Firestarter API key>","discovery":"https://api.firestarter.network/.well-known/mcp.json"},"instructions":["Connect to the MCP server at https://api.firestarter.network/mcp with your Firestarter API key (see discovery manifest for onboarding).","Call firestarter_execute with listing_id: 'lst_3GgJ90NL' — this pins the purchase to this exact listing, skipping product search — plus request: 'Buy Epic Monster Card Pages, 30 Page Pack' and a budget_max comfortably above $9.99 to cover shipping.","Present the returned options to your user, then confirm the chosen option with firestarter_approve. Never approve without an explicit user yes."]}}