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What is another word for the rate of change?
Another word for the rate of change is "derivative." In mathematics, the derivative represents how a function changes with respect to a variable, indicating the slope of the function at any given point. In a broader context, it can also refer to "velocity" or "growth rate," depending on the specific application.
How do you find second derivative of a function?
All it means to take the second derivative is to take the derivative of a function twice. For example, say you start with the function y=x2+2x The first derivative would be 2x+2 But when you take the derivative the first derivative you get the second derivative which would be 2
What is the derivative of tangent?
the derivative of tangent dy/dx [ tan(u) ]= [sec^(2)u]u' this means that the derivative of tangent of u is secant squared u times the derivative of u.
What is the derivative of negative cosine?
The derivative of negative cosine is positive sine.
Derivative as the Slope of a Tangent?
Yes, the derivative of an equation is the slope of a line tangent to the graph.
What does differentiation mean in mathematics?
Finding the derivative. The derivative is the measure of how a function changes as its input changes.
What is the continuity in mathematics?
Continuity in mathematics is the first derivative equal to zero or the Boundary condition.
What are some uses of derivative rules?
There are many uses in mathematics for derivative rules in order to derive from formulas. The main use of using derivative rules for mathematical formulas is to differentiate the logarithm.
What has the author Hugo D Junghenn written?
Hugo D. Junghenn has written: 'Option valuation' -- subject(s): Options (Finance), Mathematics, Business mathematics, Derivative securities
What is derivative for dingy?
A derivative in mathematics represents the rate of change of a function concerning its variable. For the function (f(x) = \text{dingy}), if "dingy" refers to a constant value, its derivative would be zero, indicating no change. If "dingy" is a variable or function, the derivative would depend on its specific definition. Please provide more context if you meant something else!
Is it derivative of or derivative from?
"Derivative of"
What is another word for the rate of change?
Another word for the rate of change is "derivative." In mathematics, the derivative represents how a function changes with respect to a variable, indicating the slope of the function at any given point. In a broader context, it can also refer to "velocity" or "growth rate," depending on the specific application.
What is the second derivative of a function's indefinite integral?
well, the second derivative is the derivative of the first derivative. so, the 2nd derivative of a function's indefinite integral is the derivative of the derivative of the function's indefinite integral. the derivative of a function's indefinite integral is the function, so the 2nd derivative of a function's indefinite integral is the derivative of the function.
What is this symbol s with a d backwards?
It is likely the symbol for the partial derivative, ∂, often used in mathematics to denote differentiation with respect to one variable while treating others as constants.
How is motion and position related?
Velocity is the derivative of position.Velocity is the derivative of position.Velocity is the derivative of position.Velocity is the derivative of position.
Prove that a constant vector always has a perpendicular derivative?
A dot A = A2 do a derivative of both sides derivative (A) dot A + A dot derivative(A) =0 2(derivative (A) dot A)=0 (derivative (A) dot A)=0 A * derivative (A) * cos (theta) =0 => theta =90 A and derivative (A) are perpendicular
What is the definition of relative extrema?
In mathematics, particularly in calculus, a stationary point is an input to a function where the derivative is zero (equivalently, the slope is zero): where the function "stops" increasing or decreasing (hence the name).
