Answer:
The product of the monomials is 2304
Step-by-step explanation:
* <em>Lets explain how to solve the problem</em>
- We need to find the product of the monomials (8x 6y)² and
- At first lets solve the power of the first monomial
- Because the power 2 is on the bracket then each element inside the
bracket will take power 2
∵ (8x 6y)² = (8)²(x)²(6)²(y)²
∵ (8)² = 64
∵ (x)² = x²
∵ (6)² = 36
∵ (y)² = y²
∴ (8x 6y)² = [64x² × 36y²]
∵ 64 × 36 = 2304 x²y²
∴ The first monomial is 2304 x²y²
∵ The first monomial is 2304 x²y²
∵ The second monomial is
- Lets find their product
- Remember in multiplication if two terms have same bases then we
will add their powers
∵ [2304 x²y²] × [ ] =
2304 [ ] [ ]
∵ = =
∵ = =
∴ [2304 x²y²] × [ ] = 2304
The product of the monomials is 2304
Well put 34 units on the left vertically and 17 units on the bottom hoizontially... fill it up and count how many you have
5. B, The answer is the only one that is false
6. G, Only reasonable answer
7. D, 3/5 is equivelant to 180/300
Hope this helps :D
Is it too late now?? Btw it is C
A well-defined model will tell you what represents the number of weeks of growth. Here, we have to assume that ...
x represents the number of weeks of growth.