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I really don't know how to do these problems:
Suppose that ab = 7 and a^2b + ab^2 + a+b = 80. What is a^2+b^2?
Find the ordered quintuplet (a,b,c,d,e) that satisfies the system of equations
a + 2b + 3c + 4d + 5e = 177,
2a + 3b + 4c + 5d + e = 154,
3a + 4b + 5c + d + 2e = 146,
4a + 5b + c + 2d + 3e = 138,
5a + b + 2c + 3d + 4e = 165.
Suppose p+q+r = 7 and p^2+q^2+r^2 = 9 . Then, what is the average (arithmetic mean) of the three products pq , qr , and rp ?
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For the first, you could factorise the LHS as (ab + 1)(a + b) = 8(a+b) = 80, i.e. a + b = 10. Then notice that (a + b)^2 = a^2 + 2ab + b^2.
For the second, there probably is some neat way of doing this, but you can do this easily with matrices (write in the form Ax = b, where A is a 5x5 matrix, x = (a,b,c,d,e), b = (177,154,146,138,165)).
For the third, take the equation p + q + r = 7 and multiply first by p, then q, then r to form 3 separate equations in p,q,r, then add them together. You can then re-arrange for pq + qr + rp.
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hi denis_gylaev
Q2. If you add all five equations together you'll get a value for a + b + c + d + e
If you subtract equation 2 from equation 1 you'll get a value for -a - b - c - d + 4e
So adding these gives e.
Similarly you can the other letters by subtracting pairs of equations.
Q3. p+q+r = 7 and p^2+q^2+r^2 = 9
Bob
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