Just Question 2 please I need a full and correct answer for this question by clear hand Writing water a) Without calculation, but referring to the appropriate dissociation constants, carefully sketch a single variable species distribution diagram (versus pH) for this acid in water (b) Calculate accurately the concentration of all the sulphite species at pH 7.0. Set up a spreadsheet calculation to examine the acid-base speciation of arsenate over the pH range 0 to 14. What is the %...
5.5 Write Eq. (5.4) by replacing x with n, where n is defined as dx Hence show that, just as Eq. (5.17) is the solution of Eq. (5.4) for the case of uniform Г, the solution for nonuniform Г is given by where η. 1s the value of η at x L. Note that ρ1mL is the Peclet number. If the derivation on these lines is continued, we get Eq. (5.22), where Pe must be defined as Pea(ρυ)e(6n)e. Assuming that...
2. If x e [0, 1] and n E N, show that xn+1 log(1 + x) – 10g(1 (:- (-) + nxn +(-1)n-1 n n+1 Use this to approximate log 1.5 with an error less than 0.02.
n)2" log log(n)O(n)? I don't How does =n. VIn) T n understand how VITn) 2" log 7 -)? I know we can take out the T, because 1) Vn) T* n it's in our natural logarithm. It's a constant factor. but how does (n) show up in the denominator after it used to be in the numerator? I need to know how the expression (1) right on the left is equal to the expression (1) on the n)2" log log(n)O(n)?...
(1 6 pts) We derived the thermodynamic eq. of state for dU in class. Use the same approach 6V here to derive the thermodynamic eq. of state based on dH:p sowthat equal to nb for a gas obeying the equation of state nRT
Is log((n^2)!) , ?(?log?)? Please show steps of proof. (use limits if possible)
For natural number n, an = 1+1+3+--+--log n . x dt By use log x = hen x > 0,· w 1 t Prove that the series is convergence and for any n 2 1, - 0<an n+12n(n+1) For natural number n, an = 1+1+3+--+--log n . x dt By use log x = hen x > 0,· w 1 t Prove that the series is convergence and for any n 2 1, - 0
1. Prove that log2(n) is O(n) 2. Prove that log(n!) is O(n log(n))
prove eq (19) follows from eq (16) and eq (18) eq(16): v^2=(e^2/(4pi(eo)m)(1/r) eq (18): mvr=n[h(bar)] eq (19): r=((4pieo)(h(bar))2)/(me2))(n2)
Recall that ?-n/ ??-1 log Xi is the mle of ? for a beta(8.1) distribution.Also -_ ? ial log Xi has the gamma distribution ?(n.18) (a) Show that 2eW has a x2 (2n) distribution (b) Using part (a), find c1 and c2 so that 2?? for 0 < ? < 1 . Next, obtain a (1-?)100% confidence interval for ? (c) For ? = 0.05 and n = 10, compare the length of this interval with the lengthof the interval...