Final answer:
To differentiate the function y=5x²-7x+1, apply the power rule to each term. The derivative of the function, y'=dy/dx, is 10x - 7.
Step-by-step explanation:
The student has asked how to differentiate the function y=5x²-7x+1. To find the derivative of this function, we apply the basic rules of differentiation.
- The derivative of a constant is 0.
- The derivative of x to the power of a positive integer n is n times x to the power of (n-1).
The function y=5x²-7x+1 is a polynomial, and we can differentiate each term separately:
- The derivative of 5x² is 2*5x or 10x.
- The derivative of -7x is -7.
- The derivative of the constant 1 is 0.
Therefore, the derivative of the function y with respect to x, denoted as y' or dy/dx, is 10x - 7.