Problem 1 Find the general solution: 13. :'(t) = (6 - 3) =(0) (45 21) =()...
Problem 1 Find the general solution:
9. 7(t) = 3 4 ar(t) ) (4) () 10. I'(t) 11. It) = 2. | z (t) 12. (t) = ( ) (1) Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to El, then f and g are linearly independent for allt el. If f(t) and g(t) are linearly dependent on I, then W(f:9)(t) = 0 for all tel....
find the general solution
differential equation
13. 2' (t) = | r(t) (3-1( (1 21) (2) 14. :'(t) = -5 15. :'(t) = 10 0 2 1 -2(t) 32 -1 16. :'(t) = '-3 0 2 1 -1 0r(t) -2 -1 Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to El, then f and g are linearly independent for all t E I. If f(t) and...
find the general solution for 14,15,16
differential equation
14. z't) 1 -5 21) =(0) 15. z'(t) = 10 0 2 1 -2 (t) 3 2 -1 16. x'(t) = -3 0 2 1 -1 0 (t) -2 -1 0 Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to El, then f and g are linearly independent for all t E I. If f(t) and g(t) are...
find the general solution for 6,7,8
(differential equation)
6. L'(t) = 1 1 -1 r(t) -3 -8 -5 3 2 4 7. :'(t) = 2 0 2 r(t) 4 2 3 1 8. r'(t) = 3 2 -1 2 1 4 -1 (t) Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to El, then f and g are linearly independent for all t E I. If...
problem 1 , find the general solution
differential equation
9. 2't) = = (Å -1) =(e) 10. aº(t) = (1 - 1) =(e) 11. a"(t) = ({ =) =(0) 12. 260 = -1)0 Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to El, then f and g are linearly independent for all t E I. If f(t) and g(t) are linearly dependent on I, then W(8,9)(t)...
9. :'(t) = = (Å -1) =(e) 10. aº(t) = (1 -1) =(e) 11. 2°(t) = ({ ->) (0) 12.740 = C +1) Rio (t) 13. :'(t) = 5 14. I'(t) = (45 15 3)=(0) 0 15. r'(t) = 1 0 2 1 3 2 -2 r(t) -1 16. :'(t) = -3 0 2 1 -1 0 2(t) -2 -1 Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0...
Recall: Given two functions f(t) and g(t), which are differentiable on an interval I, • If the Wronskian W(8,9)(to) #0 for some to E I, then f and g are linearly independent for all te I. • If f(t) and g(t) are linearly dependent on I, then W (8,9)(t) = 0 for allt € 1. Note: This does NOT say that "If W(8,9)(x) = 0, then f(x) and g(2) are linearly dependent. Problem 2 Determine if the following functions are...
Problem 2 Determine if the following functions are linearly independent or linearly dependent. If you believe that they are linearly dependent (i.e. W(5,9) (+) = 0, for all t in some interval) find a dependence relation. 1. f(t) = cost, g(t) = sint 2. f(t) = 61, g(t) = 64+2 3. f(t) = 9 cos 2t, g(t) = 2 cos? t - 2 sinat 4. f(t) = 2t>, g(t) = 14
Let v1= [−3 0 6]T , v2= [−2 2 3]T , v3= [0 − 6 3]T , and w= [1 14 9]T . (1). Determine if w is in the subspace spanned by v1, v2, v3. (2). Are the vectors v1, v2, v3 linearly dependent or independent? Justify your answer.
(a) Show that the functions f(t) = t2t1 and g(t) = t3 are linearly dependent on 0 < t < 1 and on -1<t< 0 (b) Show that f(t) and g(t) are linearly independent on -1 <t<1. (c) Show that W(f,g)(t) is zero for all -1<t<1.