From 333be4a3802613d3a97ec41e5cd175e9d5612fd0 Mon Sep 17 00:00:00 2001 From: Liz Faubell Date: Fri, 26 Jul 2024 17:02:11 -0700 Subject: [PATCH] Removing example tasks Issue: Test plan: --- src/examples/nested_labels/tasks.json | 104 -------------------------- 1 file changed, 104 deletions(-) delete mode 100644 src/examples/nested_labels/tasks.json diff --git a/src/examples/nested_labels/tasks.json b/src/examples/nested_labels/tasks.json deleted file mode 100644 index 1550aa1a1..000000000 --- a/src/examples/nested_labels/tasks.json +++ /dev/null @@ -1,104 +0,0 @@ -[ - { - "data": { - "dt": 1714608000000, - "kaid": "kaid_718941934514780264541355", - "link": "https:\/\/www.khanacademy.org\/profile\/me\/khanmigo\/history\/00021358b4c626c75350fffc2454e74e9fbd340b", - "segment": "grassroots-over18", - "reaction": null, - "sentiment": null, - "thread_id": "00021358b4c626c75350fffc2454e74e9fbd340b", - "unit_slug": "Learner AI Activities", - "is_allcaps": false, - "start_time": 1714690256804, - "course_slug": "AI Activities", - "domain_slug": "Internal courses", - "json_thread": "[[\"\",\"I’m here to help you with math or science questions. I won’t do your work for you, but I will help you learn how to solve them on your own.\\n\\nCan you tell me the problem or exercise you’d like to solve?\\n\\n - You can type it in or copy and paste below!\\n\\n - Click the bubble below and I can generate 10 practice problems for you!\\n\\n - If your question is about a Khan Academy exercise, please open the Khanmigo chat window on that page for more accurate and helpful support!\"],[\"Two identical rectangular prisms each have a height of 90cm. The base of each prism is a square, and the surface area of each prism is K \\\\(K\\\\left(cm\\\\right)^{2}\\\\)\",\"Let's start by understanding the problem a bit more. You mentioned that each rectangular prism has a height of 90 cm and a square base, and you're given the surface area as \\\\( K \\\\) square centimeters.\\n\\nWhat do you think we need to find out about the square base to help us solve for \\\\( K \\\\)?\"],[\"Two identical rectangular prisms each have a height of 90cm. The base of each prism is a square, and the surface area of each prism is \\\\(Kcm^{2}\\\\) . If the prisms are glued together along a square base, the resulting prism has a surface area of \\\\(\\\\frac{92}{47}K\\\\left(cm\\\\right)^{2}\\\\) . What is the side length, in cm, of each square base?\",\"Alright, let's break this down. We know that the surface area of a rectangular prism is given by \\\\(2lw + 2lh + 2wh\\\\), where \\\\(l\\\\), \\\\(w\\\\), and \\\\(h\\\\) are the length, width, and height of the prism, respectively. \\n\\nIn our case, the base of the prism is a square, so \\\\(l = w = s\\\\), the side length of the square base. So, the surface area of one prism is \\\\(2s^{2} + 4sh\\\\). \\n\\nWhen the two prisms are glued together along a square base, one of the square bases is no longer exposed, so the surface area of the resulting prism is \\\\(2K - 2s^{2}\\\\). \\n\\nWe're told that this is equal to \\\\(\\\\frac{92}{47}K\\\\). \\n\\nHow can we use this information to write an equation that we can solve for \\\\(s\\\\)?\"],[\"give me similar questions\",\"Sure, let's try a similar problem:\\n\\nTwo identical rectangular prisms each have a height of 60 cm. The base of each prism is a square, and the surface area of each prism is \\\\(M cm^{2}\\\\). If the prisms are glued together along a square base, the resulting prism has a surface area of \\\\(\\\\frac{72}{37}M cm^{2}\\\\). What is the side length, in cm, of each square base?\\n\\nRemember, the surface area of a rectangular prism with a square base is given by \\\\(2s^{2} + 4sh\\\\), where \\\\(s\\\\) is the side length of the square base and \\\\(h\\\\) is the height of the prism. When the two prisms are glued together along a square base, one of the square bases is no longer exposed, so the surface area of the resulting prism is \\\\(2M - 2s^{2}\\\\). \\n\\nCan you use this information to write an equation that we can solve for \\\\(s\\\\)?\"],[\"In the given equation ( \\\\(57\\\\left(x\\\\right)^{2}+57\\\\left(a+b\\\\right)x+ab=0\\\\) , a and b are positive constants. The product of the solutions to the given equation is kab, where k is a constant. What is the value of k?\",\"Great! We have a quadratic equation here. Remember, the product of the roots of a quadratic equation \\\\(ax^2 + bx + c = 0\\\\) is given by \\\\(\\\\frac{c}{a}\\\\). \\n\\nIn our equation \\\\(57x^2 + 57(a+b)x + ab = 0\\\\), what are the values of \\\\(a\\\\) and \\\\(c\\\\)? And how can we use these to find the product of the roots?\"],[\"just give me similar equationa\",\"Sure, here's a similar problem:\\n\\nIn the given equation \\\\(72(x)^2 + 72(c+d)x + cd = 0\\\\), \\\\(c\\\\) and \\\\(d\\\\) are positive constants. The product of the solutions to the given equation is \\\\(lcd\\\\), where \\\\(l\\\\) is a constant. What is the value of \\\\(l\\\\)?\\n\\nRemember, the product of the roots of a quadratic equation \\\\(ax^2 + bx + c = 0\\\\) is given by \\\\(\\\\frac{c}{a}\\\\). Can you use this information to find the value of \\\\(l\\\\)?\"]]", - "labeling_pk": "00021358b4c626c75350fffc2454e74e9fbd340b", - "lesson_slug": "Tutor Me", - "list_thread": [ - { - "id": "91e0f0acbaf74b579be5ab0ebb8587ed", - "text": "I’m here to help you with math or science questions. I won’t do your work for you, but I will help you learn how to solve them on your own.\n\nCan you tell me the problem or exercise you’d like to solve?\n\n - You can type it in or copy and paste below!\n\n - Click the bubble below and I can generate 10 practice problems for you!\n\n - If your question is about a Khan Academy exercise, please open the Khanmigo chat window on that page for more accurate and helpful support!", - "author": "Khamigo", - "dialogue_id": "85e606f8ebbc4baca43a6174e233fc70" - }, - { - "id": "6a1010416a234b9fb8a3c96c921425f2", - "text": "Two identical rectangular prisms each have a height of 90cm. The base of each prism is a square, and the surface area of each prism is K \\(K\\left(cm\\right)^{2}\\)", - "author": "User", - "dialogue_id": "3380f67bf08244108451b241a19a7790" - }, - { - "id": "486237593b5242ad9cc7e20302bad485", - "text": "Let's start by understanding the problem a bit more. You mentioned that each rectangular prism has a height of 90 cm and a square base, and you're given the surface area as \\( K \\) square centimeters.\n\nWhat do you think we need to find out about the square base to help us solve for \\( K \\)?", - "author": "Khamigo", - "dialogue_id": "eb06a0c0849343eeacd9b7c9bb3c2952" - }, - { - "id": "4fc1de609f0b4357b066ad5ba7ea69f7", - "text": "Two identical rectangular prisms each have a height of 90cm. The base of each prism is a square, and the surface area of each prism is \\(Kcm^{2}\\) . If the prisms are glued together along a square base, the resulting prism has a surface area of \\(\\frac{92}{47}K\\left(cm\\right)^{2}\\) . What is the side length, in cm, of each square base?", - "author": "User", - "dialogue_id": "6f67b2327d00495b8a140d58e5e1f8e9" - }, - { - "id": "cf13e116a12e4fa1b1ff85905ddb5f2e", - "text": "Alright, let's break this down. We know that the surface area of a rectangular prism is given by \\(2lw + 2lh + 2wh\\), where \\(l\\), \\(w\\), and \\(h\\) are the length, width, and height of the prism, respectively. \n\nIn our case, the base of the prism is a square, so \\(l = w = s\\), the side length of the square base. So, the surface area of one prism is \\(2s^{2} + 4sh\\). \n\nWhen the two prisms are glued together along a square base, one of the square bases is no longer exposed, so the surface area of the resulting prism is \\(2K - 2s^{2}\\). \n\nWe're told that this is equal to \\(\\frac{92}{47}K\\). \n\nHow can we use this information to write an equation that we can solve for \\(s\\)?", - "author": "Khamigo", - "dialogue_id": "bfabb7de8bb741548734cf705f4c810b" - }, - { - "id": "7344ca788b21432c996f9f2e5f402f14", - "text": "give me similar questions", - "author": "User", - "dialogue_id": "987e6d966ca346dda77e7ef779539614" - }, - { - "id": "53ab44705b6b4a01b77f009c0fd9ab80", - "text": "Sure, let's try a similar problem:\n\nTwo identical rectangular prisms each have a height of 60 cm. The base of each prism is a square, and the surface area of each prism is \\(M cm^{2}\\). If the prisms are glued together along a square base, the resulting prism has a surface area of \\(\\frac{72}{37}M cm^{2}\\). What is the side length, in cm, of each square base?\n\nRemember, the surface area of a rectangular prism with a square base is given by \\(2s^{2} + 4sh\\), where \\(s\\) is the side length of the square base and \\(h\\) is the height of the prism. When the two prisms are glued together along a square base, one of the square bases is no longer exposed, so the surface area of the resulting prism is \\(2M - 2s^{2}\\). \n\nCan you use this information to write an equation that we can solve for \\(s\\)?", - "author": "Khamigo", - "dialogue_id": "ea8900509cd54bcfa2e7ee1cc5519baa" - }, - { - "id": "060dbe6a330646f1948a9e4967b3562f", - "text": "In the given equation ( \\(57\\left(x\\right)^{2}+57\\left(a+b\\right)x+ab=0\\) , a and b are positive constants. The product of the solutions to the given equation is kab, where k is a constant. What is the value of k?", - "author": "User", - "dialogue_id": "49b5522949cd4c2887c1a9c611ecc4ce" - }, - { - "id": "a3e38a1487524a5f88ec3374565003b2", - "text": "Great! We have a quadratic equation here. Remember, the product of the roots of a quadratic equation \\(ax^2 + bx + c = 0\\) is given by \\(\\frac{c}{a}\\). \n\nIn our equation \\(57x^2 + 57(a+b)x + ab = 0\\), what are the values of \\(a\\) and \\(c\\)? And how can we use these to find the product of the roots?", - "author": "Khamigo", - "dialogue_id": "55b4aaea2a59492f971d853a0934d59f" - }, - { - "id": "12e026b73f8a463d9c1b1831abee28df", - "text": "just give me similar equationa", - "author": "User", - "dialogue_id": "23ff5a2f09374d718024ed932310bc7e" - }, - { - "id": "11215401eea14163aaf7888abf77b1ac", - "text": "Sure, here's a similar problem:\n\nIn the given equation \\(72(x)^2 + 72(c+d)x + cd = 0\\), \\(c\\) and \\(d\\) are positive constants. The product of the solutions to the given equation is \\(lcd\\), where \\(l\\) is a constant. What is the value of \\(l\\)?\n\nRemember, the product of the roots of a quadratic equation \\(ax^2 + bx + c = 0\\) is given by \\(\\frac{c}{a}\\). Can you use this information to find the value of \\(l\\)?", - "author": "Khamigo", - "dialogue_id": "5e2e523a2d6e4796b4cbc4de2b889dbb" - } - ], - "prompt_name": "activity-tutor-me-stem", - "reaction_note": null, - "sample_source": 3, - "thread_length": 6, - "highlighted_idx": 1, - "enrollment_group": "user-purchase", - "course_slug_clean": "AI Activities", - "has_reaction_note": false, - "user_primary_type": "Learner", - "has_apology_phrase": false, - "highlighted_answer": "Alright, let's break this down. We know that the surface area of a rectangular prism is given by \\(2lw + 2lh + 2wh\\), where \\(l\\), \\(w\\), and \\(h\\) are the length, width, and height of the prism, respectively. \n\nIn our case, the base of the prism is a square, so \\(l = w = s\\), the side length of the square base. So, the surface area of one prism is \\(2s^{2} + 4sh\\). \n\nWhen the two prisms are glued together along a square base, one of the square bases is no longer exposed, so the surface area of the resulting prism is \\(2K - 2s^{2}\\). \n\nWe're told that this is equal to \\(\\frac{92}{47}K\\). \n\nHow can we use this information to write an equation that we can solve for \\(s\\)?", - "highlighted_question": "", - "json_interaction_ids": "[\"3546660825359e3664634ddaaf55dc89b6f9649a\",\"209a2f469b1ce80ebde2aecff91c2d811ee65150\",\"9037a86802fe2aa55f68625ae16f9ea5a6e88659\",\"6af1200e1ab11b892992302f5787cedf220016ac\",\"5b6297c4a2da5c4c37130aba0ba9c211e13676e5\",\"ddf94248018372842955932f7647a548f5846b5f\"]", - "highlighted_interaction_id": "209a2f469b1ce80ebde2aecff91c2d811ee65150" - }, - "predictions": [] - } -]