Let A = {0, 2, 4, 6, 8, 10}, B = {0, 3, 6, 9}, C = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10}, and D = {0, 4, 8}. Determine if the statement is true or false.D ? D

Solve.A certain amount of money saved for 1 year at a certain annual interest rate (simple interest) yielded $13.80 in interest. If we had added $23 to the principal and reduced the interest rate by 2 percentage point(s), the interest would have been the same. Find the principal and the rate.

A. $2.32, 17% B. $14.00, 10% C. $14.00, 12% D. $115.00, 12%

Use the properties of parallel lines to solve the problem.In the figure,      . m?ABC = 56°. Find the measures of angles ?ABE, ?FCD , and ?BCD.

A. m?BCD = 56°, m?ABE = m?FCD = 124° B. m?BCD = m?ABE = 56°, m?FCD = 124° C. m?BCD = m?ABE = m?FCD = 34° D. m?BCD = 56°, m?ABE = m?FCD = 34°

Start with the given graph of y.  a) Describe a sequence of transformations that results in the graph of g(x);  b) Find the range of g(x);  c) Find the horizontal asymptote of the graph of g(x).y = 3x; g(x) = -5(33 - 5x) + 4

A. a) The graph of y = 3^x is compressed horizontally by a factor of , reflected in the y-axis, shifted  unit to the right, stretched vertically by a factor of 5, and shifted four units up.
b) (4, ?)
c) y = 4
B. a) The graph of y = 3^x is compressed horizontally by a factor of , shifted  units to the right, stretched vertically by a factor of 5, reflected in the x-axis, and shifted four units up.
b) (-?, 4)
c) y = 4
C. a) The graph of y = 3^x is compressed horizontally by a factor of , reflected in the y-axis, shifted  unit to the right, stretched vertically by a factor of 5, reflected in the x-axis, and shifted four units up.
b) (-?, 4)
c) y = 4
D. a) The graph of y = 3^x is compressed horizontally by a factor of , reflected in the y-axis, shifted  unit to the left, stretched vertically by a factor of 5, reflected in the x-axis, and shifted four units down.
b) (-?, -4)
c) y = -4)

Provide an appropriate response.Given the solutions of a quadratic equation, is it possible to reconstruct the original equation? Why or why not?

What will be an ideal response?