( 3 p +2 c ) ( 2 p + 4 c )

It looks like you've written a mathematical expression that appears to be a product of two binomials: $(3p + 2c)$ and $(2p + 4c)$. If you want to multiply these two binomials together, you can use the distributive property (also known as the FOIL method):

$(3p + 2c) \times (2p + 4c)$

Here's how you can perform the multiplication step by step using the distributive property:

1. First terms: Multiply the first terms of each binomial. $3p \times 2p = 6p^2$

2. Outer terms: Multiply the outer terms of each binomial. $3p \times 4c = 12pc$

3. Inner terms: Multiply the inner terms of each binomial. $2c \times 2p = 4cp$

4. Last terms: Multiply the last terms of each binomial. $2c \times 4c = 8c^2$

Now, add up all these results: $6p^2 + 12pc + 4cp + 8c^2$

Since both $12pc$ and $4cp$ are the same, you can combine them: $6p^2 + 16pc + 8c^2$

So, the result of multiplying $(3p + 2c)$ and $(2p + 4c)$ is $6p^2 + 16pc + 8c^2$.

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