Answer:
38.957625 US$
Step-by-step explanation:
38.957625 US$
In(xy) = e^(x+y)
(xy)'/xy = (x+y)' e^(x+y)
(x'y + xy')/xy = (1+y') e^(x+y)
(y + xy')/xy = (1+y')e^(x+y) and simplify
Hope this helps
Answer:
60
Step-by-step explanation:
I answered cause like you're my bsf on this page so yea...
:)
If you want to check if (1,2) is a solution to the system, you have to plug the x and y values back into both equations. If they work for one equation, but not the other, than the coordinates are not a solution to the system.
3(1) - 4(2) = -5
3 - 8 = -5
-5 = -5
2 = 4(1) - 2
2 = 4 - 2
2 = 2
Since both of these checks are true, then (1,2) is a solution to the system.
(4,6), Using the midpoint formula which is (( x1 + x2)/2), ((y1+y2)/2)
