Final answer:
The algebraic expression 36y^4+30y^3/6y simplifies to 6y^3 + 5y^2 in high school Mathematics.
Step-by-step explanation:
The question involves simplifying a polynomial expression and appears to be a topic in High School Mathematics, specifically in algebra.
Given the expression 36y^4+30y^3/6y, simplification would involve dividing both terms in the numerator by the term in the denominator. When we divide the terms, we get 6y^3 + 5y^2, which is the simplified form of the polynomial expression.
However, the additional content provided doesn't seem directly relevant to the student's question.
Simplifying given expressions and solving equations is a core skill in algebra, which is a branch of mathematics commonly taught in high school. Being confident in algebra is important for success in higher-level math courses and standardized tests like the SAT.
The expression 36y^4 + 30y^3 / 6y can be simplified step-by-step as follows:
Divide 30y^3 by 6y, which equals 5y^2.
Now, the expression becomes 36y^4 + 5y^2.
There are no like terms, so the expression cannot be simplified further.
Therefore, the simplified form of the given expression is 36y^4 + 5y^2.