Final answer:
The correct standard form for a polynomial is the terms ordered in descending powers with respect to the variable, which none of the provided options fully represent. For illustrating purposes, an example of a polynomial in standard form is 5x² + 2x, with the leading coefficient being 5.
Step-by-step explanation:
The correct polynomial form from the provided options would be (d) -362 + 1462 + 46 + 3 + 2b, assuming we are combining like terms and ordering the terms in descending powers (if any variables were included with exponents). However, none of the options given is in the standard form of a polynomial since we expect the terms to be organized by descending degree with respect to the variable. The leading coefficient is typically determined after the polynomial is arranged in the correct standard form and would be the coefficient of the term with the highest degree.
Regarding the SEO keywords provided, they don't directly relate to the process of organizing a polynomial in standard form. To illustrate how a polynomial should be organized including finding the leading coefficient, here's an example:
If we have a polynomial like 3x + 5x^2 - x, its standard form would be 5x^2 + 2x, and the leading coefficient would be 5 because 5x^2 is the term with the highest degree (degree 2).