Asked by Collins
X+y+z=1......(1)
x^2+y^2+z^2=35........(2)
x^3+y^3+z^3=97.........(3)
solution but from 3
(x^3+y^3)=(x+y)^3-3xy(x+y)......(4)
puting 4 into 3 bck
(x+y)^3-3xy(x+y)+z^3=97.......(5)
now from 1
x+y=1-z......(6)
putin 6 into 7 we have
(1-z)^3-3xy(1-z)+z^3=97
[1-2z+z^2](1-z)-3xy(1-z)+z^3=97
1(1-2z+z^2)-z(1-2z+z^2)-3xy(1-z)+z^3=97
1-2z+z^2-z+2z^2-z^3-3xy(1-z)+z^3=97
3z^2-3z-z-3xy(1-z)=96
3z^2-4z-3xy(1-z)=96........(8)
but from 2
(x^2+y^2)=(x+y)^2-2xy.........(9)
putin 9 bck to 2
(x+y)^2-xy+z^2=35......(10)
puting 6 into 10
(1-z)^2-xy+z^2=35
[1-2z+z^2)-2xy+z^2=35
2z^2-2z-2xy=34
z^2-z-xy=17
-xy=17-z^2-z
-xy=17-z^2+z
xy=-17+z^2-z
xy=z^2-z-17
putin xy into8
3z^2-3z-z-3(z^2-z-17)(1-z)=96
3z^2-4z-3(z^2-z-17)(1-z)=96....plz help me finish it
x^2+y^2+z^2=35........(2)
x^3+y^3+z^3=97.........(3)
solution but from 3
(x^3+y^3)=(x+y)^3-3xy(x+y)......(4)
puting 4 into 3 bck
(x+y)^3-3xy(x+y)+z^3=97.......(5)
now from 1
x+y=1-z......(6)
putin 6 into 7 we have
(1-z)^3-3xy(1-z)+z^3=97
[1-2z+z^2](1-z)-3xy(1-z)+z^3=97
1(1-2z+z^2)-z(1-2z+z^2)-3xy(1-z)+z^3=97
1-2z+z^2-z+2z^2-z^3-3xy(1-z)+z^3=97
3z^2-3z-z-3xy(1-z)=96
3z^2-4z-3xy(1-z)=96........(8)
but from 2
(x^2+y^2)=(x+y)^2-2xy.........(9)
putin 9 bck to 2
(x+y)^2-xy+z^2=35......(10)
puting 6 into 10
(1-z)^2-xy+z^2=35
[1-2z+z^2)-2xy+z^2=35
2z^2-2z-2xy=34
z^2-z-xy=17
-xy=17-z^2-z
-xy=17-z^2+z
xy=-17+z^2-z
xy=z^2-z-17
putin xy into8
3z^2-3z-z-3(z^2-z-17)(1-z)=96
3z^2-4z-3(z^2-z-17)(1-z)=96....plz help me finish it
Answers
Answered by
Collins
Plz it is 3z not 4z
Answered by
Steve
well, if we want integer solutions, it is clear that not all the values can be positive. However, squares are positive, and we know that
1^2+3^2+5^2 = 35
You will need to make one or two of the variables negative, so you sum to 1, but that should work for the cubes as well.
1^2+3^2+5^2 = 35
You will need to make one or two of the variables negative, so you sum to 1, but that should work for the cubes as well.
Answered by
Collins
Steve can u please just interpret what you are saying for me please..so that i can continue
Answered by
Steve
well, using the values 1,3,5
how can you make them add up to 1 if not all are positive?
how can you make them add up to 1 if not all are positive?
Answered by
Collins
Yez i got that steve thanks so much wish to be like you someday
There are no AI answers yet. The ability to request AI answers is coming soon!