Ontbinden in factoren (2)

\(-48b^{9}+168b^{7}y-147b^{5}y^2\)
\(-4s^{6}-4s^{5}-s^{4}\)
\(48a^{17}-147a^{3}\)
\(9b^{4}+12b^{3}+4b^{2}\)
\(25a^{14}+40a^{9}x+16a^{4}x^2\)
\(-9p^{18}+16p^{4}\)
\(x^{6}-36x^{4}\)
\(80p^{9}-280p^{6}q+245p^{3}q^2\)
\(-54p^{6}-144p^{5}-96p^{4}\)
\(64a^{10}+16a^{6}x+a^{2}x^2\)
\(-2q^{4}+128q^{2}\)
\(36q^{18}-q^{2}\)

\(-48b^{9}+168b^{7}y-147b^{5}y^2=-3b^{5}(16b^{4}-56b^2y+49y^2)=-3b^{5}(4b^2-7y)^2\)
\(-4s^{6}-4s^{5}-s^{4}=-s^{4}(4s^{2}+4s+1)=-s^{4}(2s+1)^2\)
\(48a^{17}-147a^{3}=3a^{3}(16a^{14}-49)=3a^{3}(4a^7+7)(4a^7-7)\)
\(9b^{4}+12b^{3}+4b^{2}=b^{2}(9b^{2}+12b+4)=b^{2}(3b+2)^2\)
\(25a^{14}+40a^{9}x+16a^{4}x^2=a^{4}(25a^{10}+40a^5x+16x^2)=a^{4}(5a^5+4x)^2\)
\(-9p^{18}+16p^{4}=-p^{4}(9p^{14}-16)=-p^{4}(3p^7+4)(3p^7-4)\)
\(x^{6}-36x^{4}=x^{4}(x^2-36)=x^{4}(x+6)(x-6)\)
\(80p^{9}-280p^{6}q+245p^{3}q^2=5p^{3}(16p^{6}-56p^3q+49q^2)=5p^{3}(4p^3-7q)^2\)
\(-54p^{6}-144p^{5}-96p^{4}=-6p^{4}(9p^{2}+24p+16)=-6p^{4}(3p+4)^2\)
\(64a^{10}+16a^{6}x+a^{2}x^2=a^{2}(64a^{8}+16a^4x+x^2)=a^{2}(8a^4+x)^2\)
\(-2q^{4}+128q^{2}=-2q^{2}(q^2-64)=-2q^{2}(q+8)(q-8)\)
\(36q^{18}-q^{2}=q^{2}(36q^{16}-1)=q^{2}(6q^8+1)(6q^8-1)\)

Oefeningengenerator wiskundeoefeningen.be 2025-12-30 12:58:09
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