Find Riemann sum of sin x from a to b by using limit?

Then teach the underlying concepts
Don't copy without citing sources
preview
?

Explanation

Explain in detail...

Explanation:

I want someone to double check my answer

1
Jan 11, 2017

${\int}_{a}^{b} \sin \left(x\right) \mathrm{dx} = {\lim}_{n \to \infty} \frac{b - a}{n} {\sum}_{k = 0}^{n} \sin \left(a + \frac{k}{n} \left(b - a\right)\right)$

Explanation:

${\int}_{a}^{b} \sin \left(x\right) \mathrm{dx} = {\lim}_{n \to \infty} \frac{b - a}{n} {\sum}_{k = 0}^{n} \sin \left(a + \frac{k}{n} \left(b - a\right)\right)$

• 8 minutes ago
• 8 minutes ago
• 10 minutes ago
• 10 minutes ago
• A minute ago
• 3 minutes ago
• 3 minutes ago
• 4 minutes ago
• 5 minutes ago
• 7 minutes ago
• 8 minutes ago
• 8 minutes ago
• 10 minutes ago
• 10 minutes ago