Ontbinden in factoren (2)

\(-27x^{14}+75x^{2}\)
\(-108p^{5}-36p^{4}-3p^{3}\)
\(-6q^{5}+216q^{3}\)
\(-2s^{4}+8s^{2}\)
\(-36p^{16}+25p^{4}\)
\(-294p^{9}-336p^{7}q-96p^{5}q^2\)
\(-24s^{13}-72s^{8}-54s^{3}\)
\(p^{4}+12p^{3}+36p^{2}\)
\(q^{6}-6q^{5}+9q^{4}\)
\(-12y^{4}+147y^{2}\)
\(-5s^{5}+10s^{4}-5s^{3}\)
\(64x^{5}-112x^{4}+49x^{3}\)

\(-27x^{14}+75x^{2}=-3x^{2}(9x^{12}-25)=-3x^{2}(3x^6+5)(3x^6-5)\)
\(-108p^{5}-36p^{4}-3p^{3}=-3p^{3}(36p^{2}+12p+1)=-3p^{3}(6p+1)^2\)
\(-6q^{5}+216q^{3}=-6q^{3}(q^2-36)=-6q^{3}(q+6)(q-6)\)
\(-2s^{4}+8s^{2}=-2s^{2}(s^2-4)=-2s^{2}(s-2)(s+2)\)
\(-36p^{16}+25p^{4}=-p^{4}(36p^{12}-25)=-p^{4}(6p^6+5)(6p^6-5)\)
\(-294p^{9}-336p^{7}q-96p^{5}q^2=-6p^{5}(49p^{4}+56p^2q+16q^2)=-6p^{5}(7p^2+4q)^2\)
\(-24s^{13}-72s^{8}-54s^{3}=-6s^{3}(4s^{10}+12s^5+9)=-6s^{3}(2s^5+3)^2\)
\(p^{4}+12p^{3}+36p^{2}=p^{2}(p^2+12p+36)=p^{2}(p+6)^2\)
\(q^{6}-6q^{5}+9q^{4}=q^{4}(q^2-6q+9)=q^{4}(q-3)^2\)
\(-12y^{4}+147y^{2}=-3y^{2}(4y^{2}-49)=-3y^{2}(2y+7)(2y-7)\)
\(-5s^{5}+10s^{4}-5s^{3}=-5s^{3}(s^2-2s+1)=-5s^{3}(s-1)^2\)
\(64x^{5}-112x^{4}+49x^{3}=x^{3}(64x^{2}-112x+49)=x^{3}(8x-7)^2\)

Oefeningengenerator wiskundeoefeningen.be 2025-12-24 20:09:25
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