ππΆ1 = Β½ *[ (-3,0- -4,0) β (201,124 + 200,721) + (0,0 - -3,0) β (200,479 + 201,124) + (4,0 β 0,0) β (200,879+200,479) + (4,0 -4,0) ...
Existe algΓΊn valor de (x;y) ββ, que verifica: (π₯+π¦)2β(π₯βπ¦)2=4
Determine the eigenvalues and eigenvectors of the matrix
| -2 -1 0 |
| 1 0 2 |
| 0 2 -2 |
Factoriza: F(x;y) = (π+π)πβπππ(π+π)π+πππππ, e indicar el factor primo mayor
ππΆ1 = Β½ [ (-3,0- -4,0) β (201,124 + 200,721) + (0,0 - -3,0) β (200,479 + 201,124) + (4,0 β 0,0) β (200,879+200,479) + (4,0 -4,0) β...
Determine os autovalores e autovetores da matriz
evaluate 3β0.3881
Find
g'(3)
given that
f(3) = β8, fβ'(3) = 7, and g(x) =
4x + 9
f(x)
12.345 Γ· 6.5
(xy^3 / 4x^2) Γ· (3y^5 / 8x^3 y) =