Chapter 8 - Linear Differential Equations of Order n - 8.1 General Theory for Linear Differential Equations - Problems - Page 503: 3

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1. Determine Ly: $$Ly = y' - xy$$ (a) 2. Substitute y = $2e^{3x}$: $$L(2e^{3x}) = (2e^{3x})^3- 2x(2e^{3x})^2$$ 3. Derivate: $$L(2e^{3x}) = 54e^{3x} - 36xe^{3x}$$ (b) 2. Substitute y = $3 ln(x)$: $$L(3 ln(x)) = (3 ln(x))^3- 2x(3 ln(x))^2$$ 3. Derivate: $$L(3 ln(x)) = \frac{6}{x^3} +\frac{6}{x}$$ (c) 2. Substitute y = $2e^{3x} + 3 ln(x)$: $$L(2e^{3x} + 3 ln(x)) = (2e^{3x} + 3 ln(x))^3 - 2x(2e^{3x} + 3 ln(x))^2$$ 3. Derivate: $$L(2e^{3x} + 3 ln(x)) =54e^{3x}-36xe^{3x}+\frac{6}{x^3}+\frac{6}{x}$$