(6x^5−0,5y^2) x (6x^5+0,5y^2)

It looks like you want to multiply two expressions:

Expression 1: $6x^5 - 0.5y^2$ Expression 2: $6x^5 + 0.5y^2$

To multiply these expressions, you can use the distributive property (also known as the FOIL method). When you apply the distributive property, you multiply each term in the first expression by each term in the second expression and then combine like terms. Let's go through the multiplication step by step:

Expression 1: $6x^5 - 0.5y^2$ Expression 2: $6x^5 + 0.5y^2$

Multiply the terms: $(6x^5) \cdot (6x^5) + (6x^5) \cdot (0.5y^2) - (0.5y^2) \cdot (6x^5) - (0.5y^2) \cdot (0.5y^2)$

Simplify each term: $36x^{10} + 3x^5y^2 - 3x^5y^2 - 0.25y^4$

Combine like terms: $36x^{10} - 0.25y^4$

So, the result of the multiplication $(6x^5 - 0.5y^2) \cdot (6x^5 + 0.5y^2)$ is $36x^{10} - 0.25y^4$.

0 0