**Download On The Axes Provided Sketch A Slope Field
Background**. (a) on the axes provided, sketch a slope field for the given differential equation at the six points indicated. Write an equation for the line tangent to the graph of y = f ( x) at x = 2.

A good way to introduce slope fields to your class is to put or project a coordinate system on the board. However, i want to remove the space between the axis and the actual plot. Slope measurement is necessary in the world of civil engineering, design, landscaping before you take any laser tools out on the job, be sure to thoroughly read the manuals and play around with the features in order to feel confident in.

### A on the axes provided, sketch a slope field for the given differential equation at the 9 points indicated.

(a) sketch two approximate solutions of the differential equation on the slope field, one of which passes. Use your slope field to explain (c) find the particular solution ()yfx=to the differential equation with the initial condition (d) sketch a solution curve that passes through the point ()0,1−on your slope field. Take note that the slope obtained would be the same no matter which two points on the line were selected to determine the rise and the run. Notice that in the graph below, the red dot is always found on the main vertical axis of the cartesian plane.