Graph each function, identify the domain and range, and compare the graph with the graph of y=x^1. 1.y=x^-10 Domain: Range: compare: 2.y=x+3^1+3 Domain: Range: compare: solve and graph.

y=-10/x

To graph each function, identify the domain and range, and compare it with y=x^1, we can follow these steps:

1. For the function y = x^-10:

a. To graph this function, plot several points by selecting different values of x, and calculating the corresponding y-values using the given function.

b. The domain of this function, denoted as D, is all real numbers except 0. This means that x can take any value except 0.

c. The range, denoted as R, is all real numbers greater than 0. Since the function involves negative exponents, the resulting values will be a fraction with a positive numerator and denominator.

d. To compare the graph of y = x^-10 with y = x^1, we can notice that both functions have different rates of change. While y = x^-10 decreases rapidly as x approaches infinity or negative infinity, y = x^1 increases at a steady rate as x increases.

2. For the function y = (x+3)^1+3:

a. To graph this function, follow the same process as before. Select different values of x and calculate the corresponding y-values.

b. The domain of this function is all real numbers. There are no restrictions on the values of x.

c. The range is also all real numbers. With no restrictions on y, any real value could be obtained.

d. To compare the graph of y = (x+3)^1+3 with y = x^1, notice that both functions have the same rate of change, but the graph of y = (x+3)^1+3 is shifted 3 units up compared to y = x^1.

To solve and graph these functions, additional details or equations are required. Please provide specific equations or instructions for further assistance.