Show that the functions fx x2 and gx 1x are linearly indep
Show that the functions f(x) = x^2 and g(x) = 1/x are linearly independent on the interval (0, infinity). Show that the vectors V_1 = [-1 2 1 3], V_2 = [1 3 4 7]; and v_3 = [1 1 2 3] dependent by finding a linear dependence relation that they satisfy.
Solution
Let, v3=av1+bv2
So,
1=-a+b
1=2a+3b
2=4a+b
3=3a+7b
a=-2/5,b=3/5
So,
v3=-2v1/5+3v2/5
![Show that the functions f(x) = x^2 and g(x) = 1/x are linearly independent on the interval (0, infinity). Show that the vectors V_1 = [-1 2 1 3], V_2 = [1 3 4 Show that the functions f(x) = x^2 and g(x) = 1/x are linearly independent on the interval (0, infinity). Show that the vectors V_1 = [-1 2 1 3], V_2 = [1 3 4](/WebImages/31/show-that-the-functions-fx-x2-and-gx-1x-are-linearly-indep-1087801-1761572269-0.webp)