Assume that the expression is:
y = 9e^(t)
Remember that the derivative of e^(t) with respect to t is e^(t). If we take the derivative of the function y, we have..
dy/dt = 9 d[e^(t)]/dt
Note that I factor out the constant 9. If we keep the 9 in the brackets, then the solution doesn't make a difference.
nobody is sure but him. he will tell the world on Thursday on ESPN 9et
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.
The derivative of 40 is zero. The derivative of any constant is zero.
Derivative of 4x is 4.
the derivative is 0. the derivative of a constant is always 0.
You can take out any constant from a derivative. In other words, this is the same as 5 times the derivative of sec x.
A latin derivative can be filial:)<3
The derivative of xe is e. The derivative of xe is exe-1.
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
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
Velocity is the derivative of position.Velocity is the derivative of position.Velocity is the derivative of position.Velocity is the derivative of position.
the derivative of 3x is 3 the derivative of x cubed is 3 times x squared
The derivative with respect to 'x' is 4y3 . The derivative with respect to 'y' is 12xy2 .
The derivative of x is 1.
The derivative of 5x is 5.
The derivative of velocity is acceleration.
A derivative adjective is one formed from a verb by the addition of a suffix. These suffixes include -ful (full), -ive, -ant, and -ent. (The word derivative can itself be a derivativeadjective.)
Trig functions have their own special derivatives that you will have to memorize. For instance: the derivative of sinx is cosx. The derivative of cosx is -sinx The derivative of tanx is sec2x The derivative of cscx is -cscxcotx The derivative of secx is secxtanx The derivative of cotx is -csc2x
The first derivative of ln x is 1/x, which (for the following) you better write as x-1.Now use the power rule:Second derivative (the derivative of the first derivative) is -1x-2, the third derivative is the derivative of this, or 2x-3. You may now wish to write this in the alternative form, as 2 / x3.
The word "derivative" is the noun form of the word "derive. " An example of a sentence using the word "derivative" is "Narcotic painkillers are a derivative of the opium poppy. "
All of the following are responsibilities of derivative classifiers EXCEPT: Derivative classifiers must have access to classification guidance. Derivative classifiers must understand derivative classification policies and procedures. Derivative classifiers must have original classification authority. Derivative classifiers must possess the requisite subject matter expertise, as well as classified management and marking techniques.
In calculus, a derivative is basically the slope of a function. For example the derivative of 3x + 1 is 3, and the derivative of 5x2 is 10x. A derivative can also be a word derived (made) from another word. For example, "electricity" is a derivative of "electric". A derivative can also be a compound made from another compound (as in chemistry). Anything that "results from deviation" can be called a derivative. This basically means that if something is made from, or branches of something else, it can be called a derivative.
The derivative of popular is popularism (n).