The expression g(4) = 3.04 appears to be the output of a function for an input value of 4, possibly related to a quadratic equation, but without more context, its specific significance is unclear.
The statement g(4) = 3.04 typically represents a point on the graph of a function where the input value (often time or another variable represented by 't') is equal to 4, and the corresponding output value (or 'g(t)') is equal to 3.04. In the context of a quadratic equation, it might represent the value of the function for an input of 4 when the function is defined by certain coefficients. However, based on the information provided, it is unclear what specific role or significance this point has without the actual function g(t).
Regarding the quadratic equation at² + bt + c = 0 with a = 4.90, b = 14.3, and c = -20.0, the provided constants suggest they are to be used in the quadratic formula to find the roots of the equation. This formula is x = (-b ± √(b² - 4ac))/(2a), where 'x' represents the solutions to the equation.
The question probable may be:
What does the expression g(4) = 3.04 signify, and how might it relate to a quadratic equation? Additionally, how are the given coefficients a = 4.90, b = 14.3, and c = -20.0 utilized in the quadratic formula?