Find the particular solution for the initial value problem. (4x + 4)y = ; y(0) = 1

Rationalize the denominator.

A.
B.
C.
D.

Solve the equation. Identify the equation as an identity, an inconsistent equation, or a conditional equation. +  = 

A. Inconsistent, ? B. Conditional, {4} C. Conditional, {-5} D. Identity, {all real numbers}

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 = 5x; g(x) = x + 2

A. a) The graph of y = 5x is stretched horizontally by a factor of 4 and shifted two units up. b) (2, ?) c) y = 2 B. a) The graph of y = 5x is stretched vertically by a factor of 4 and shifted two units down. b) (-2, ?) c) y = -2 C. a) The graph of y = 5x is stretched vertically by a factor of 4 and shifted two units up. b) (2, ?) c) y = 2 D. a) The graph of y = 5x is stretched horizontally by a factor of 4 and shifted two units down. b) (-2, ?) c) y = -2

Add.67 + (-6)

A. -73 B. 61 C. -61 D. 73