Select the correct answer.
Using graphing, what are the approximate solutions to this equation?
12x3 = log (2x-3)+2
A. x 1.505 and x 2.688
O B.
x-1.222 and -1.523
0 с.
x-1.431 and a -2.863
O D.
x1.505 and x 2.376

To find the approximate solutions to the equation 12x^3 = log(2x-3) + 2 using graphing, follow these steps: 1. Graph the functions on either side of the equation separately: - The left side function: y = 12x^3 - The right side function: y = log(2x-3) + 2 2. Find the points of intersection of these two graphs. These points represent the solutions to the equation. 3. Locate the x-coordinates of the intersection points on the graph. These x-values correspond to the approximate solutions to the equation. After analyzing the graphs and identifying the intersection points, you can determine the approximate solutions based on their x-coordinates. Given the options provided: A. x 1.505 and x 2.688 B. x -1.222 and x -1.523 C. x -1.431 and x -2.863 D. x 1.505 and x 2.376 The correct answer for the approximate solutions would be: A. x 1.505 and x 2.688 By following the steps outlined above and comparing the x-coordinates of the intersection points with the given options, you can select the correct answer for the approximate solutions to the equation.

Select the correct answer. Using graphing, what are the approximate solutions to this equation? 12x3 = log (2x-3)+2 A. x 1.505 and x 2.688 O B. x-1.222 and -1.523 0 с. x-1.431 and a -2.863 O D. x1.505 and x 2.376

Answer :

Other Questions

Select the correct answer.
Using graphing, what are the approximate solutions to this equation?
12x3 = log (2x-3)+2
A. x 1.505 and x 2.688
O B.
x-1.222 and -1.523
0 с.
x-1.431 and a -2.863
O D.
x1.505 and x 2.376