Question: 6. A differential equation together with an initial condition is called an Initial Value Problem (IVP). To solve an IVP one first must find the

6. A differential equation together with an initial condition is called an Initial Value Problem (IVP). To solve an IVP one first must find the general solution and then use the initial condition to find the particular solution corresponding to the initial condition. Solve the following IVP: dy it 1/(2) = -1 (a) For what values of t is your solution valid? Why? (b) Check to see that your particular solution "fits" the differential equation by substituting the solution and its derivative into the original differential equation. (c) Use the GeoGebra applet, https://ggbm.at/Sblk2n4H, to check to see that your specific solution "fits" the differential equation by plotting the slope field and then plotting the graph of the solution of the slope field. Explain how this relates to Jerry's ar

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