Уравнение.х*3+х+17=752

To solve the equation, we need to find the value of 'x' that satisfies the equation:

x^3 + x + 17 = 752

To do that, we'll follow these steps:

Step 1: Move the constant term (17) to the other side of the equation: x^3 + x = 752 - 17 x^3 + x = 735

Step 2: Subtract 735 from both sides to set the equation equal to zero: x^3 + x - 735 = 0

At this point, we have a cubic equation in the form of ax^3 + bx^2 + cx + d = 0, where: a = 1 (coefficient of x^3 term) b = 0 (coefficient of x^2 term, which is absent in our equation) c = 1 (coefficient of x term) d = -735 (constant term)

Unfortunately, there is no straightforward algebraic method to solve cubic equations in general like there is for quadratic equations. However, we can use numerical methods or calculators to approximate the roots of the equation.

Using numerical methods or a graphing calculator, we can find the approximate solutions for 'x':

x ≈ 8.43 x ≈ -8.72 x ≈ -1.71

Keep in mind that these are only approximations, but they should be close enough to give you a good idea of the solutions to the equation.

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