A rectangular pasture has a fence around the perimeter. The length of the fence is 16x7 and the width is 48x4. What is the area of the pasture? %0D%0A(1 point)%0D%0AResponses%0D%0A%0D%0A3x3%0D%0A3 x 3%0D%0A%0D%0A128x11%0D%0A128 x 11%0D%0A%0D%0A768x11%0D%0A768 x 11%0D%0A%0D%0A768x28
The length of the fence is 16x7 and the width is 48x4. To find the area of the pasture, we need to multiply the length and width.
Area = Length x Width
Area = (16x7) x (48x4)
Using the distributive property, we can simplify:
Area = 16*48*x*7*4
Multiplying the numbers and variables:
Area = 768*x*28
Therefore, the area of the pasture is 768x28.
To find the area of the pasture, we need to multiply the length by the width.
The length of the pasture is given as 16x7, and the width is given as 48x4. To find the actual values of these expressions, we can simplify them by multiplying the coefficients and adding the exponents.
For the length, 16x7, the coefficient is 16 and the exponent is 7. So we have 16^1 * x^7 = 16x^7.
Similarly, for the width, 48x4, the coefficient is 48 and the exponent is 4. So we have 48^1 * x^4 = 48x^4.
Now we can find the area by multiplying the length and the width: (16x^7) * (48x^4) = 16 * 48 * x^7 * x^4.
To simplify this expression, we multiply the coefficients (16 * 48 = 768) and add the exponents of x (7 + 4 = 11): 768 * x^11.
Therefore, the area of the pasture is 768x^11.
To find the area of a rectangular pasture, you need to multiply its length by its width.
Here, the length of the fence is given as 16x7 and the width is given as 48x4.
To find the area, you can multiply the two expressions:
Area = (16x7) x (48x4)
To simplify this, you can use the distributive property of multiplication:
Area = (16 x 7) x (48 x 4)
= (112) x (192)
Now, multiply the numbers:
Area = 112 x 192
= 21,504
Therefore, the area of the pasture is 21,504 square units.