Ejercicio De Calculo Integral
fx=x+13x2-4
ddxuv=ud(v)dx+v ddx(u)
X | Y |
-7.0 | -858.0 |
-6.0 | -520.0 |
-5.0 | -284.0 |
-4.0 | -132.0 |
-3.0 | -46.0 |
-2.0 | -8.0 |
-1.0 | 0|
0 | -4.0 |
1.0 | -2.0 |
2.0 | 24.0 |
3.0 | 92.0 |
4.0 | 220.0 |
5.0 | 426.0 |
6.0 | 728.0 |
7.0 | 1144.0 |
dydx=x+1ddx3x2-4+3x2-4ddx(x+1)
dydx=x+1ddx(3x2)-ddx(4)+3x2-4ddxx+ddx(1)
ddx=x+13ddxx2-0+3x2-41+0
dydx=x+13(2x)+3x2-4(1)
dydx=x+16x+(3x2-4)
dydx=6x2+6x+3x2-4
dydx=9x2+6x-4
X | Y |
-7.0 | -4.0303x10^7 |
-6.0 | -1.0054x10^7 |
-5.0 | -1.9437x10^6|
-4.0 | -2.5901x10^5 |
-3.0 | -1.8921x10^4 |
-2.0 | -402.0 |
-1.0 | 5.0 |
0 | 0 |
1.0 | 3.0 |
2.0 | 434.0 |
3.0 | 1.8993x10^4 |
4.0 | 2.5914x10^5 |
5.0 | 1.9439x10^6 |
6.0 |1.0055x10^7 |
7.0 | 4.0303x10^7 |
fx=x9-3x5+4x2+x
ddxxn=nx-1
dydx=ddxx9-ddx3x5+ddx4x2+ddxx
dydx=(9x9-1-3ddxx5+4ddxx2+1
dydx=9x8-35x4+42x+1
dydx=9x8-15x4+8x+1
X | Y |
-7.0 |48.9943 |
-6.0 | 35.9961 |
-5.0 | 24.9976 |
-4.0 | 15.9987 |
-3.0 | 8.9994 |
-2.0 | 3.9998 |
-1.0 | 1.0 |
0 | Error |
1.0 | 1.0 |
2.0 | 3.9998 |
3.0 | 8.9994 |
4.0 | 15.9987 |
5.0 |24.9976 |
6.0 | 35.9961 |
7.0 | 48.9943 |
fx= elnx2
dy(ev)dx= ev . d(v)dx
dydx=(elnx2)∙d(ln x2)dx
dydx=(elnx2) . 1x2d(x2)dx
dydx=(elnx2) . 1x2(2x)
dydx=elnx2. 2xx2fx)=x2-2xx2+5x
ddxuv=vdudx-(u)d(v)dxv2
ddx=x2+5xdx2-2xdx-(x2-2x)d(x2+5x)dxx2+5x2
ddx=x2+5xdx2dx-d(2x)dx-(x2-2x)d(x2)dx+d(5x)dxx2+5x2
ddx=x2+5x2x2-1-2d(x)dx-(x2-2x)2x2-1+5d(x)dxx2+5x2ddx=x2+5x2x-2(1)-(x2-2x)2x+5(1)x2+5x2
ddx=x2+5x(2x-2)-(x2-2x)(2x+5)x2+5x2
X | Y |
-7.0 | 4.5 |
-6.0 | 8.0 |
-5.0 | Error |
-4.0 | -6.0 |
-3.0 | -2.5 |
-2.0 | -1.3333 |
-1.0 | -0.75 |
0 |Error |
1.0 | -0.1667 |
2.0 | 0 |
3.0 | 0.125 |
4.0 | 0.2222 |
5.0 | 0.3 |
6.0 | 0.3636 |
7.0 | 0.4167 |
8.0 | 0.4615 |
ddx=2x3-2x2+10x2-10x-2x3-5x2+4x2+10xx4+5x2
ddx=7x2x2+5x2...
Regístrate para leer el documento completo.