QUESTION 16 1 points Save Answer The propagation of uncertainty formula for the equation y-mx b is V(Aym)2+(Ay(Ayb) where Yn-(mx + b) _ ((m + &n)x + b). Дух-(mx + b) _ (m(x + 5x) + b) and 5x and Sb are the uncertainties on m. x and b respectively. Ifm-o/- 0.3. x - -4.8-0.5 and b - 16/-0g then what is the uncertainty on y? O-(mx + b) _ (mx + (b + Sb)). The values 5m, QUESTION 17...
The propagation of uncertainty formula for the equation y-mx-b is/ Aym)2 + ( (Дуь) where ym-(mx + b)-((m + &m)x + b). Дух-(mx + b)-(m(x + 5x) + b) and ΔΥο (mx + b) _ (mx + (b + δb). The values &m·5x and 5b are the uncertainties on m. x and b respectively. If m -39/- 0.5.x-0.2/-0.5 and b 1.5*/-o.6 then what is the uncertainty on y? The propagation of uncertainty formula for the equation y-mx-b is/ Aym)2 +...
12. let Mx(1) be the moment generating function of X. Show that (a) Mex+o(t) = eMx(at). (b) TX - Normal(), o?) and moment generating function of X is Mx (0) - to'p. Show that the random variable 2 - Normal(0,1) 13. IX. X X . are mutually independent normal random variables with means t o ... and variances o, o,...,0, then prove that X NOEL ?). 14. If Mx(1) be the moment generating function of X. Show that (a) log(Mx...
1. Suppose m,b,c E R. Prove: f(1) = mx + b is continuous at c. 2. Prove: f(x) = x3 is continuous at 5.
Problem 5. Prove that parametric equations: x a-cosh(s) (a > 0) or back half(a < 0) of hyperboloid of one sheet: Χ t), y b-sinh(s) cos (t) zc-sinh(s) sin( t), (x,y,z) lies on the front half L" a2 b2 c2 Problem 6 What graph of this Compute the arc length : rit)- < sin t, cos t, 2Vt', when 0<t < function: a) Compute the arc length : re)-3cos(9) and 0 < θ < π/2 b) Problem 7. Find parametric...
Find the equation of the line / in the figure below. Give exact values using the form y = mx + b. m= b= f(x) = 10 х log 3
The propagation of uncertainty formula for the equation y - mx ob is (ym)+ (AVX)2 + (AVP)? where AVm = (mx +b) – ((m + Sm)x+b)..Ayx = (mx +b) - (m(x + 5x)+b) and Ayb = (mx+b) – (mx +(b + Sb)). The values Sm. Sx and Sb are the uncertainties on m,x and b respectively. If m - -4.5+/-0.3. - 12+/-0.2 and b = -4.7+/-0.5 then what is the uncertainty on y?
Problem 4. Let n E N. We consider the vector space R” (a) Prove that for all X, Y CR”, if X IY then Span(X) 1 Span(Y). (b) Let X and Y be linearly independent subsets of R”. Prove that if X IY, then X UY is linearly independent. (C) Prove that every maximally pairwise orthogonal set of vectors in R” has n + 1 elements. Definition: Let V be a vector space and let U and W be subspaces...
c language. A complex number N is defined as: N = x + iy , where x is the real part and y is the imaginary part. The power of N is real and defined as: N^2 = x^2 + y^2, Write a function called cpower that returns the power of complex number. The function takes in x and y as double values and returns the power as a double value.
Prove that ab ≤ 1/2(a2 + b2) for any real numbers a and b.