The Boltzmann Entropy equation is given by:
S = k ln(W)
Here k is Boltzmann constant and W is the number of microstates corresponding to the gas's macrostate.
-k=ln(1/3) so k=ln(3) how come it makes sense? what kind of ln Rule does it use?
If g(x)=−ln(1−x) , what is g^(k)(0) (for k=1,2,3,… ) ?options:a) 1/kb)1/1-kc)k!d)(k-1)!e) (k+1)!
let u= ln(x) and v=ln(y) w=ln(z) where x,y,z>0 .Write thr following wxpressiins in terms of u,v, and w. a) ln( squareroot x^5)/ y^3z^2) B) ln (squareroot x^3 4squaroot y)
A student generates a plot of ln(k) vs ln[OH-]. The result yields a straight line with the equation: y = 1.89x + 1.04 According to this data, what is the order of the reaction in OH-, to the nearest whole number?
What data should be plotted to show that experimental concentration data fits a first-order reaction? ln(k) vs. Ea ln[reactant] vs. time ln(k) vs. 1/T 1/[reactant] vs. time [reactant] vs. time
a) Let z,w ∈ C, prove or disprove: Ln(z/w) = Lnz − Lnw b) Find all values in C and the principal value of j^j and ln(-3) c) Find all z ∈ C such that i. tanh z = 2 ii. e^z = 0 iii. Ln(Ln(z)) = −jπ
Please show work and explain: A student generates a plot of ln(k) vs ln[OH-]. The result yields a straight line with the equation: y = 1.01x + -0.92 According to this data, what is the order of the reaction in OH-, to the nearest whole number?
ln(k) = -E_a/R 1/T + ln(A) A plot of ln (k)versus 1/T result in a straight line with a slope = -E_a/R. The value of E_a can then be calculated using the value of R and to the slope of the line. This experiment uses the Arrhenius equation, which relates the temperature and specific reaction rate constant to determine the activation energy for the crystal violet reaction. The reaction will be performed at different temperatures. Once the order of reaction...
the slope of a line graph of ln k versus 1/T is -1.82 ×10^4 K what is the final temperature if it is observed that the rate constant of a reaction increases by a factor of 20 when increased from 25 deg Celsius to this higher final temperature ? (detailed solution please )
Prove that Z [i] satisfies the definition of Euclidean Domain : W/Z = N(W) LN(z)