show that the mean square radius of a spherucal nucleus of a radius R is given...

An approximate experiment expression for the radius (R) of a nucleus is R = Ro A^1/3,...

An approximate experiment expression for the radius (R) of a nucleus is R = Ro A^1/3, where Ro = 1.2 x 10^-15 m and A is the mass number of the nucleus. (a) Find the nuclear radii of atoms of the noble gases: He, Ne, Ar, Kr, Xe, and Rn. (b) Determine the density of the nuclei associated with each of these species and compare them. Does your answer surprise you?

A particle α is trapped in a nucleus of radius r = 9.01 x10 ^-15 m....

A particle α is trapped in a nucleus of radius r = 9.01 x10 ^-15 m. What is the probability that the particle escapes from the nucleus if its energy is (a) 8.78 MeV and Consider that the potential barrier (V) is 26.2 MeV with a width of 17.9 fm.

Model Summary Model R R Square Adjusted R Square      Std. Error of the Estimate 1...

Model Summary Model R R Square Adjusted R Square      Std. Error of the Estimate 1 .816 .666 .629 1.23721 a. Predictors: (Constant),x         ANOVA     Model Sum of Squares df Mean Square F                       Sig Regression Residual Total 27.500 13.776 41.276 1 9 10 27.500 1.531 17.966                 .002b                    a. Dependent Variable: Y                    b. Predictors: (Constant), X Coefficients Model Understand Coefficients B               Std Error Standardized Coefficients      Beta t Sig 1 (Constant)        x 3.001             1.125 .500                 .118 .816 2.667...

If R(theta)=[(cos, -sin) (sin, cos)] 1) show that R(theta) is a linear transformation from R2->R2 2)Show...

If R(theta)=[(cos, -sin) (sin, cos)] 1) show that R(theta) is a linear transformation from R2->R2 2)Show that R(theta) of R(alpha) = R(theta + alpha) 3) Find R(45degrees) [(x), (y)], interpret it geometrically

compute r,r2 and 1-r2 for the problem below .What does r,r2 and 1-r2 mean ? Is...

compute r,r2 and 1-r2 for the problem below .What does r,r2 and 1-r2 mean ? Is the correlation strong or weak ? You are given the following data:                                X(Independent Variable)                             Y(Dependent variable) Month   Advertising Expenditure (in Millions of $)   Sales Revenue (in Millions of $)       July                       1                                                                         3 August                2                                                                         7 September          3                                                                         5 October               4                                                                         11 November           5                                                                         14

# given a radius, find the area of a circle def get_area_circle(r):        """        ...

# given a radius, find the area of a circle def get_area_circle(r):        """         what it takes             radius of a circle (any positive real number)         what it does:             computes the area of a circle             given a radius, find the area of a circle             area = pi*r2 (pi times r squared)         what it returns             area of a circle. Any positive real number (float)     """         # your code goes in...

A solid non-conducting sphere of radius R has a nonuniform charge    distribution of volume charge...

A solid non-conducting sphere of radius R has a nonuniform charge    distribution of volume charge density ρ = rρs/R, where ρs is a constant and    r is the distance from the centre of the sphere.    Show that:    (a) the total charge on the sphere is Q = π ρsR3 and    (b) the magnitude of the electric field inside the sphere is given by the    equation        E = (Q r2 / 4π ε0R4)

In Euclidean (flat) space, a circle’s circumference C is related to its radius r by C...

In Euclidean (flat) space, a circle’s circumference C is related to its radius r by C = 2πr. Formally, this can be shown by integrating the infinitesimal distance element ds around the circumference: C = ! ds = ! 2π 0 rdθ = 2πr , (1) where the second equality holds because the 2-D Euclidean metric is ds2 = dr2 + r2dθ2, and dr = 0 for a circle of constant radius r. (a) In a 2-D space of positive...

Let R = (1 2 3 ) and F = (1 2 ). Here R and...

Let R = (1 2 3 ) and F = (1 2 ). Here R and F are elements in S3 given in cycle notation. Show that S3 = {e, R, F, R2, RF, R2F}

1.     Given a circle centered at C with a radius of r and a point P...

1.     Given a circle centered at C with a radius of r and a point P outside of the circle. If segment PT is tangent to the circle at T show that the power of point P with respect to the circle is equal to PT squared.