Problem

(a) Verify that y1 = x3 and are linearly independent solutions of the differential e...

(a) Verify that y1 = x3 and are linearly independent solutions of the differential equation on the interval

(b) Show that W( y1, y2) = 0 for every real number x. Does this result violate Theorem 4.1.3? Explain.

(c) Verify that Y1 = x3 and Y2 = x2 are also linearly independent solutions of the differential equation in part (a) on the interval

(d) Find a solution of the differential equation satisfying

(e) By the superposition principle, Theorem 4.1.2, both linear combinations y = c1y1 + c2y2 and Y = c1Y1 = c2Y2 are solutions of the differential equation. Discuss whether one, both, or neither of the linear combinations is a general solution of the differential equation on the interval

(reference theorem 4.1.2)

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Solutions For Problems in Chapter 4.1
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