Asked by Franklin:
Using the first rule of derivative find 8(x-y)12?? And how can i solve these y^x+x^y=17,x+y=5
Answers
Answered by
Reiny
The first part is somewhat vague.
Are you finding the derivative of 8(x-y)^12 with respect to x , with respect to y, with respect to ?
assuming "with respect to x",
d(8(x-y)^12)/dx = 96(x-y)^11 (1 - dy/dx)
your second question:
y^x + x^y = 17 and x+y=5
Since this would be a very nasty question, my first impulse was to assume there might be an integer solution.
So we would have the sum of two powers equal to 17
possible powers ≤ 17
1 --- > anybase^0
4 ---> 2^2
8 ---> 2^3
9 ---> 3^2
16 ---> 4^2
sure enough!!
2^3 + 3^2 = 8+9 = 17 AND 3+2 = 5
so x=2, y=3 OR x=3, y=2
Are you finding the derivative of 8(x-y)^12 with respect to x , with respect to y, with respect to ?
assuming "with respect to x",
d(8(x-y)^12)/dx = 96(x-y)^11 (1 - dy/dx)
your second question:
y^x + x^y = 17 and x+y=5
Since this would be a very nasty question, my first impulse was to assume there might be an integer solution.
So we would have the sum of two powers equal to 17
possible powers ≤ 17
1 --- > anybase^0
4 ---> 2^2
8 ---> 2^3
9 ---> 3^2
16 ---> 4^2
sure enough!!
2^3 + 3^2 = 8+9 = 17 AND 3+2 = 5
so x=2, y=3 OR x=3, y=2
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