Ontbinden in factoren (2)

\(-6p^{4}-36p^{3}-54p^{2}\)
\(-y^{6}-16y^{5}-64y^{4}\)
\(80p^{19}-45p^{5}\)
\(192a^{11}+48a^{7}p+3a^{3}p^2\)
\(-72a^{5}+50a^{3}\)
\(16q^{12}-25q^{4}\)
\(80y^{7}-45y^{5}\)
\(24p^{12}+120p^{7}s+150p^{2}s^2\)
\(245y^{6}-210y^{5}+45y^{4}\)
\(-128a^{5}-96a^{4}-18a^{3}\)
\(45b^{5}-80b^{3}\)
\(180q^{12}-5q^{4}\)

\(-6p^{4}-36p^{3}-54p^{2}=-6p^{2}(p^2+6p+9)=-6p^{2}(p+3)^2\)
\(-y^{6}-16y^{5}-64y^{4}=-y^{4}(y^2+16y+64)=-y^{4}(y+8)^2\)
\(80p^{19}-45p^{5}=5p^{5}(16p^{14}-9)=5p^{5}(4p^7+3)(4p^7-3)\)
\(192a^{11}+48a^{7}p+3a^{3}p^2=3a^{3}(64a^{8}+16a^4p+p^2)=3a^{3}(8a^4+p)^2\)
\(-72a^{5}+50a^{3}=-2a^{3}(36a^{2}-25)=-2a^{3}(6a+5)(6a-5)\)
\(16q^{12}-25q^{4}=q^{4}(16q^{8}-25)=q^{4}(4q^4+5)(4q^4-5)\)
\(80y^{7}-45y^{5}=5y^{5}(16y^{2}-9)=5y^{5}(4y+3)(4y-3)\)
\(24p^{12}+120p^{7}s+150p^{2}s^2=6p^{2}(4p^{10}+20p^5s+25s^2)=6p^{2}(2p^5+5s)^2\)
\(245y^{6}-210y^{5}+45y^{4}=5y^{4}(49y^{2}-42y+9)=5y^{4}(7y-3)^2\)
\(-128a^{5}-96a^{4}-18a^{3}=-2a^{3}(64a^{2}+48a+9)=-2a^{3}(8a+3)^2\)
\(45b^{5}-80b^{3}=5b^{3}(9b^{2}-16)=5b^{3}(3b+4)(3b-4)\)
\(180q^{12}-5q^{4}=5q^{4}(36q^{8}-1)=5q^{4}(6q^4+1)(6q^4-1)\)

Oefeningengenerator wiskundeoefeningen.be 2026-01-31 16:32:11
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