q01, 1/26: solve d^k y/dx^k = 1, where k is a positive integer. q02, 1/31: find a general solution to y'=x+y-1 q03, 2/02: find two solutions to y'-y=0. q04, 2/07: Use Euler's Method to find an approximate solution to the equation y'=(4-y^2)y, y(0)=1. Find y(1) using h=1/4. q05, 2/09: find general solution (not just the trivial solution) to y''-2y'-3y=0. q06, 2/14: give an example of two functions of x that are linearly independent for all real numbers x. q07, 2/16: Determine whether the functions y_1=x and y_2=x^2 are independent and state the reason. q08, 2/23: Find all solutions of y''' - 3y' - 2y = 0. q09, 2/28: 9.3, group work 1,2. q10, 3/01: find all real-valued solutions for y^(4) - 5y'' + 4y = 0 q11, 3/06: 9.3: group work 3,4. q12, 3/08: p.93: 1(i) q13, 3/13: p.190: 2(a) q14, 3/15: p.198: 1(c) q15, 5/10: 9.7: parts 1 and 2 |

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