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England schools
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England university
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Scotland schools
Taxonomy: mathcentre
Taxonomy: Kind of activity
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From users who are members of Katie's workspace :
Katie Lester | said | Ready to use | 9 years, 3 months ago |
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Katie Lester 9 years, 3 months ago
Gave some feedback: Ready to use
Katie Lester 9 years, 4 months ago
Created this as a copy of Indefinite integral by substitution.There are 34 other versions that do you not have access to.
Name | Type | Generated Value |
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a | list |
[ 5, 1, 3, 2, 2 ]
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b | list |
[ -1, -1, 3, -2, 9 ]
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m | list |
[ 6, 8, 7, 5, 9 ]
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Generated value: list
[ 5, 1, 3, 2, 2 ]
→ Used by:
- Advice
- "Unnamed part" - prompt
- "Unnamed part" → "Gap 0." - Correct answer
- "Unnamed part" → "Gap 1." - Correct answer
- "Unnamed part" → "Gap 2." - Correct answer
- "Unnamed part" → "Gap 3." - Minimum accepted value
- "Unnamed part" → "Gap 3." - Maximum accepted value
Gap-fill
Ask the student a question, and give any hints about how they should answer this part.
I={∫x({a[0]}x2+{b[0]}){m[0]}dx}
Use u={{a[0]}x2+{b[0]}} as your substitution.
dudx=
dx=
Substituting back into the original equation for dx and pulling out constants gives
I=
The next step is to integrate.
{∫u{m[0]}du}=
Putting all of these results together, we get the final answer of:
Use this tab to check that this question works as expected.
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This question is used in the following exam: