ЯсноПонятно24

This system of equations can be solved by setting up a system of linear equations and solving for the variables a, b, c, and d.

Let's rewrite the equations in a more standard form:

a1^3 + b1^2 + c1 + d = 4489113 a2^3 + b2^2 + c2 + d = 4489112 a3^3 + b3^2 + c3 + d = 4489111 a4^3 + b4^2 + c4 + d = 4489110

We can subtract the second equation from the first to get:

(a1^3 - a2^3) + (b1^2 - b2^2) + (c1 - c2) = 1

Similarly, subtracting the third equation from the second gives:

(a2^3 - a3^3) + (b2^2 - b3^2) + (c2 - c3) = 1

And subtracting the fourth equation from the third gives:

(a3^3 - a4^3) + (b3^2 - b4^2) + (c3 - c4) = 1

Now we have a system of three linear equations in terms of a, b, and c. We can solve this system using standard methods such as substitution or elimination. Once we have found the values of a, b, and c, we can substitute them back into any of the original equations to solve for d.