Lecture 14 - Stony Brook AMS
... set of possible values B=h(A)={h(a):aA}. Suppose that the inverse of y=h(x) is the function x=h-1(y), which is differentiable for all value of yB. Then fY, the density function of Y, is given by f Y ( y) f X (h 1 ( y))|(h 1 )'( y)|, y B. In computer simulation, one applied the probability in ...
... set of possible values B=h(A)={h(a):aA}. Suppose that the inverse of y=h(x) is the function x=h-1(y), which is differentiable for all value of yB. Then fY, the density function of Y, is given by f Y ( y) f X (h 1 ( y))|(h 1 )'( y)|, y B. In computer simulation, one applied the probability in ...
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... . twoway function betaden(0.5,0.5,x), ytitle(density) xtitle(p) . twoway function betaden(0.5,0.5,invlogit(x)) * (exp(x) / (1 + exp(x))^2), > ra(-10 10) ytitle(density) xtitle(logit p) ...
... . twoway function betaden(0.5,0.5,x), ytitle(density) xtitle(p) . twoway function betaden(0.5,0.5,invlogit(x)) * (exp(x) / (1 + exp(x))^2), > ra(-10 10) ytitle(density) xtitle(logit p) ...
1991 AP CALCULUS AB FREE-RESPONSE
... (a) How fast is the shadow of the tightrope walker’s feet moving along the ground when she is midway between the buildings? (Indicate units of measure) (b) How far from point A is the tightrope walker when the shadow of her feet reaches the base of the Tee Building? (Indicate units of measure) (c) H ...
... (a) How fast is the shadow of the tightrope walker’s feet moving along the ground when she is midway between the buildings? (Indicate units of measure) (b) How far from point A is the tightrope walker when the shadow of her feet reaches the base of the Tee Building? (Indicate units of measure) (c) H ...