Pangkat Bulat - UK 2

$6^3 \cdot 6^4 = (6 \times 6 \times 6) \cdot (6 \times 6 \times 6 \times 6)$ $= 6 \times 6 \times 6 \times 6 \times 6 \times 6 \times 6$ $= 6^7$

Setelah mengerjakan soal di atas, dapat disimpulkan bahwa jika $a$ adalah bilangan real, $m$ dan $n$ adalah bilangan bulat maka:

$\large a^m \cdot a^n = a^{m+n}$

$x^2 \cdot x^5 = x^{2+5}$ $= x^7$

$(-7)^2 \cdot (-7)^3 = (-7)^{2+3}$ $= (-7)^5$ $= (-7) \times (-7) \times (-7) \times (-7) \times (-7)$ $= 49 \times (-7) \times (-7) \times (-7)$ $= (-343) \times (-7) \times (-7)$ $= 2401 \times (-7)$ $= -16807$ $= -(7^5)$ $= -7^5$

$2^2 \cdot 2^3 \cdot 2^4 = (2)^{2+3} \cdot 2^4$ $= 2^5 \cdot 2^4$ $= 2^{5+4}$ $= 2^9$

$(7 a^3 b^4) \cdot (3 a^5 b^2) = 7 \times 3 \times a^3 \times a^5 \times b^4 \times b^2$ $= 21 \times a^{3+5} \times b^{4+2}$ $= 21 a^8 b^6$

$(x^2+y^2)(x^2-y^2) = (x^2 \cdot x^2) + (x^2 \cdot (-y^2)) + (y^2 \cdot x^2) + (y^2 \cdot (-y^2))$ $= x^{2+2} - x^2y^2 + y^2x^2 - y^{2+2}$ $= x^4 - x^2y^2 + x^2y^2 - y^4$ $= x^4 - y^4$

$(x^2-xy+y^2)(x+y) = (x^2 \cdot x) + (x^2 \cdot y) + ((-xy) \cdot x) + ((-xy) \cdot y) + (y^2 \cdot x) + (y^2 \cdot y)$ $= x^3 + x^2y - x^2y - xy^2 + xy^2 + y^3$ $= x^3 + y^3$

$(x^{2n} + 2x^ny^n + y^{2n})(x^{2n} - 2x^ny^n + y^{2n})$ $= (x^{2n} \cdot x^{2n}) + (x^{2n} \cdot (- 2x^ny^n)) + (x^{2n} \cdot y^{2n}) + (2x^ny^n \cdot x^{2n}) + (2x^ny^n \cdot (- 2x^ny^n)) + (2x^ny^n \cdot y^{2n}) + (y^{2n} \cdot x^{2n}) + (y^{2n} \cdot (- 2x^ny^n)) + (y^{2n} \cdot y^{2n})$ $= x^{4n} - 2x^{3n}y^n + x^{2n}y^{2n} + 2x^{3n}y^n - 4x^{2n}y^{2n} + 2x^ny^{3n} + x^{2n}y^{2n} - 2x^ny^{3n} + y^{4n}$

Kelompokkan suku sejenis: $= x^{4n} + (-2x^{3n}y^n + 2x^{3n}y^n) + (x^{2n}y^{2n} + x^{2n}y^{2n} - 4x^{2n}y^{2n}) + (2x^ny^{3n} - 2x^ny^{3n}) + y^{4n}$ $= x^{4n} - 2x^{2n}y^{2n} + y^{4n}$