AI-MO
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NuminaMath-7B-TIR

@@ -4,19 +4,46 @@ tags:
 - alignment-handbook
 - generated_from_trainer
 widget:
-  - example_title: Math problem
-    messages:
-      - role: user
-        content: "For how many values of the constant $k$ will the polynomial $x^{2}+kx+36$ have two distinct integer roots?"
-    output:
-      text: >-
-        ### Solution: 1. For the polynomial \\( x^2 + kx + 36 \\) to have two distinct integer roots, let's denote these roots by \\( r_1 \\) and \\( r_2 \\).\n\n2. According to Vieta's formulas, the sum of the roots \\( r_1 + r_2 \\) is equal to \\(-k\\), and the product of the roots \\( r_1 \\cdot r_2 \\) is equal to 36.\n\n3. To find the distinct integer pairs \\((r_1, r_2)\\) whose product is 36, we need to determine all pairs of integers \\((r_1, r_2)\\) such that \\( r_1 \\cdot r_2 = 36 \\) and \\( r_1 \\neq r_2 \\).\n\n4. From the equation \\( r_1 + r_2 = -k \\), for each valid pair \\((r_1, r_2)\\), we can compute the corresponding value of \\( k \\).\n\n5. Finally, since we need the polynomial to have two distinct integer roots, we need to ensure that \\( r_1 \\) and \\( r_2 \\) are distinct.\n\nLet's start by finding all pairs \\((r_1, r_2)\\) such that \\( r_1 \\cdot r_2 = 36 \\). We'll then determine the values of \\( k \\) and ensure the roots are distinct.\n```python\nimport itertools\n\n# Find all pairs (r1, r2) such that r1 * r2 = 36\nproduct_36 = 36\nfactor_pairs = []\n\nfor i in range(1, product_36 + 1):\n if product_36 % i == 0:\n pair = (i, product_36 // i)\n if pair[0] != pair[1]: # Ensure distinct pairs\n factor_pairs.append(pair)\n\n# Calculate k for each pair and ensure distinct integer roots\nvalid_k_values = set()\nfor r1, r2 in factor_pairs:\n if r1 != r2:\n k = -(r1 + r2)\n valid_k_values.add(k)\n\nprint((len(valid_k_values), sorted(valid_k_values)))\n```\n```output\n(4, [-37, -20, -15, -13])\n```\nThe distinct integer values of \\( k \\) that make the polynomial \\( x^2 + kx + 36 \\) have two distinct integer roots are \\(-37, -20, -15, \\text{and} -13\\).\n\nTherefore, the number of such values of \\( k \\) is:\n\n\\[\n\\boxed{4}\n\\]\n
 pipeline_tag: text-generation
 model-index:
 - name: NuminaMath-7B-TIR
   results: []
 ---
 <!-- This model card has been generated automatically according to the information the Trainer had access to. You

 - alignment-handbook
 - generated_from_trainer
 widget:
+- example_title: Math problem
+  messages:
+  - role: user
+    content: >-
+      For how many values of the constant $k$ will the polynomial $x^{2}+kx+36$
+      have two distinct integer roots?
+  output:
+    text: >-
+      ### Solution: 1. For the polynomial \\( x^2 + kx + 36 \\) to have two
+      distinct integer roots, let's denote these roots by \\( r_1 \\) and \\(
+      r_2 \\).\n\n2. According to Vieta's formulas, the sum of the roots \\( r_1
+      + r_2 \\) is equal to \\(-k\\), and the product of the roots \\( r_1
+      \\cdot r_2 \\) is equal to 36.\n\n3. To find the distinct integer pairs
+      \\((r_1, r_2)\\) whose product is 36, we need to determine all pairs of
+      integers \\((r_1, r_2)\\) such that \\( r_1 \\cdot r_2 = 36 \\) and \\(
+      r_1 \\neq r_2 \\).\n\n4. From the equation \\( r_1 + r_2 = -k \\), for
+      each valid pair \\((r_1, r_2)\\), we can compute the corresponding value
+      of \\( k \\).\n\n5. Finally, since we need the polynomial to have two
+      distinct integer roots, we need to ensure that \\( r_1 \\) and \\( r_2 \\)
+      are distinct.\n\nLet's start by finding all pairs \\((r_1, r_2)\\) such
+      that \\( r_1 \\cdot r_2 = 36 \\). We'll then determine the values of \\( k
+      \\) and ensure the roots are distinct.\n```python\nimport itertools\n\n#
+      Find all pairs (r1, r2) such that r1 * r2 = 36\nproduct_36 =
+      36\nfactor_pairs = []\n\nfor i in range(1, product_36 + 1):\n if
+      product_36 % i == 0:\n pair = (i, product_36 // i)\n if pair[0] !=
+      pair[1]: # Ensure distinct pairs\n factor_pairs.append(pair)\n\n#
+      Calculate k for each pair and ensure distinct integer
+      roots\nvalid_k_values = set()\nfor r1, r2 in factor_pairs:\n if r1 !=
+      r2:\n k = -(r1 + r2)\n
+      valid_k_values.add(k)\n\nprint((len(valid_k_values),
+      sorted(valid_k_values)))\n```\n```output\n(4, [-37, -20, -15,
+      -13])\n```\nThe distinct integer values of \\( k \\) that make the
+      polynomial \\( x^2 + kx + 36 \\) have two distinct integer roots are
+      \\(-37, -20, -15, \\text{and} -13\\).\n\nTherefore, the number of such
+      values of \\( k \\) is:\n\n\\[\n\\boxed{4}\n\\]\n
 pipeline_tag: text-generation
 model-index:
 - name: NuminaMath-7B-TIR
   results: []
+license: apache-2.0
 ---
 <!-- This model card has been generated automatically according to the information the Trainer had access to. You