To express the equation 64x6 + 27 as a sum of cubes, we first recognize that this can be rewritten in the form of a3 + b3, where:
- a corresponds to (4x2) since (4x2)3 = 64x6, and
- b corresponds to 3 since 33 = 27.
Now we rewrite the expression:
64x6 + 27 = (4x2)3 + 33Next, we can apply the sum of cubes formula, which is:
a3 + b3 = (a + b)(a2 - ab + b2)Substituting a = 4x2 and b = 3 into the formula gives us:
(4x2 + 3)((4x2)2 - (4x2)(3) + 32)Now simplifying:
- (4x2)2 = 16x4
- (4x2)(3) = 12x2
- 32 = 9
Putting it all together, we get:
(4x2 + 3)(16x4 - 12x2 + 9)Thus, we can express 64x6 + 27 as the sum of cubes:
Final Result:
64x6 + 27 = (4x2 + 3)(16x4 - 12x2 + 9)This representation not only illustrates the polynomial’s structure but also showcases how sum of cubes can simplify complex expressions into more manageable forms.