G
Guest
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My prob is to solve x^2 + 3xy + y^2 = 6y by implicit differentiation.
Im having trouble understanding how to diff the function with respect to x & y. Let me just show you:
ok first I diff each term w/respect to x:
d/dx(x^2) + d/dx(3xy) + d/dx(y^2) = d/dx(6y),
so now, diff func of x w/respect to x and fcn of y w/respect to x so:
3x + d/dy(3xy) * dy/dx + d/dy(y^2) * dy/dx = d/dy(6y) * dy/dx
so,
3x + 3x dy/dx + 2y dy/dx = 6 dy/dx, then I rearranged to collect like terms,
3x = 6dy/dx - 3x dy/dx - 2y dy/dx, so,
3x = (6-3x-2y)dy/dx, = dy/dx = 3x/(6-3x-2y)????
Im having trouble understanding how to diff the function with respect to x & y. Let me just show you:
ok first I diff each term w/respect to x:
d/dx(x^2) + d/dx(3xy) + d/dx(y^2) = d/dx(6y),
so now, diff func of x w/respect to x and fcn of y w/respect to x so:
3x + d/dy(3xy) * dy/dx + d/dy(y^2) * dy/dx = d/dy(6y) * dy/dx
so,
3x + 3x dy/dx + 2y dy/dx = 6 dy/dx, then I rearranged to collect like terms,
3x = 6dy/dx - 3x dy/dx - 2y dy/dx, so,
3x = (6-3x-2y)dy/dx, = dy/dx = 3x/(6-3x-2y)????