| Exam Board | OCR MEI |
|---|---|
| Module | C2 (Core Mathematics 2) |
| Marks | 4 |
| Paper | Download PDF ↗ |
| Mark scheme | Download PDF ↗ |
| Topic | Indefinite & Definite Integrals |
| Type | Basic indefinite integration |
| Difficulty | Easy -1.2 This is a straightforward application of the power rule for integration with no complications. It requires only basic recall of the formula ∫x^n dx = x^(n+1)/(n+1) + c applied to two simple polynomial terms, making it easier than average and typical of routine C2 integration practice. |
| Spec | 1.08b Integrate x^n: where n != -1 and sums |
| Answer | Marks |
|---|---|
| 12 | x6 |
| Answer | Marks |
|---|---|
| +c | M2 |
| Answer | Marks |
|---|---|
| [4] | M1 for each term |
Question 12:
12 | x6
5
kx2
6
k = 4
+c | M2
A1
A1
[4] | M1 for each term
if at least M1 earnedFind $\int (x^5 + 10x^3) dx$. [4]
\hfill \mbox{\textit{OCR MEI C2 Q12 [4]}}