Practice More
Type your Answer Verifyx^2 | x^ | \log_ | \sqrt | \nthroot[\msquare] | \le | \ge | \frac <\msquare> | \cdot | \div | x^ | \pi |
\left(\square\right)^ | \frac | \frac <\partial> | \int | \int_<\msquare>^ | \lim | \sum | \infty | \theta | (f\:\circ\:g) | f(x) |
x^2 | x^ | \log_ | \sqrt | \nthroot[\msquare] | \le | \ge | \frac <\msquare> | \cdot | \div | x^ | \pi |
\left(\square\right)^ | \frac | \frac <\partial> | \int | \int_<\msquare>^ | \lim | \sum | \infty | \theta | (f\:\circ\:g) | f(x) |
- \twostack | \lt | 7 | 8 | 9 | \div | AC |
+ \twostack | \gt | 4 | 5 | 6 | \times | \square\frac |
\times \twostack | \left( | 1 | 2 | 3 | - | x |
▭\:\longdivision | \right) | . | 0 | = | + | y |
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Verify your Answer Subscribe to verify your answer Save to Notebook! Sign in to save notes Show Steps Hide StepsThe Derivative Calculator is an invaluable online tool designed to compute derivatives efficiently, aiding students, educators, and professionals alike. Here's how to utilize its capabilities:
In the previous posts we covered the basic derivative rules, trigonometric functions, logarithms and exponents.