derivative of tanx sec^2 x Derivative of cscx -cscxcotx derivative of cotx (cosx/sinx) -csc^2x derivative of secx (1/cosx) secxtanx arcsinx U prime/square root of 1-usquared arccos(x) -uprime/ square root of 1-usquared arctan(x) ...
Derivative of two polynomials, one of them being squared Homework Statement find derivative of (x-2)(x-3)^2 Homework Equations using product rule. The Attempt at a Solution 1(x-3)^2+2(x-3) x^2-6x-9 +2x-6 x^2-4x-15 doesn't factor. ...
MHB205.8.9 Find the derivative of the function 205.8.9 Find the derivative of the function $y=\cos(\tan(5t-4))\\$ chain rule $u=\tan(5t-4)$ $\frac{d}{du}\cos{(u)} \frac{d}{dt}\tan{\left(5t-4\right)}\\$ then $-\sin{\left (u \right )}\cdot 5 \sec^{2}{\left...
On top of the standard gauged supergravity at two derivatives, we allow for the Weyl-squared [26] (here denoted as W) and T-log [27] (here denoted as T) infinite towers of higher derivative terms. Technically, our analysis of the supersymmetry variations in the presence of hypermultiplets...
y = ′′ (y double prime, d squared y dx squared) 3 (third derivative): ) ( y dx d y′′ = ′′′ (y triple prime) n (nth derivative): ) ( ) 1 ( ) ( − = n n y dx d y (y super n) 2 3 2 3 + − = x x y x x y 6 3 ...
rule used to take the derivatives of fractions or rational functions. Basically, the mnemonic for the quotient rule talks about the higher term (numerator) and the lower term (denominator). The mnemonic of the quotient rule is "low de high minus high de low divided by low squared". ...
1. Given a function f(x,y) at (x0,y0). Find the two angles the directional derivative makes with the x-axis, where the directional derivative is 1. The angles lie in (-pi,pi]. 2. f(x,y) = sec(pi/14)*sqrt(x^2 + y^2) p0 = (6,6) 3. I use the relation D_u = gr...