Zonder de gemeenschappelijke factor af. Ontbind verder in factoren indien mogelijk.
- \(98p^{9}-168p^{7}q+72p^{5}q^2\)
- \(-12x^{14}-12x^{9}-3x^{4}\)
- \(72b^{7}+24b^{6}+2b^{5}\)
- \(-216y^{11}+360y^{8}-150y^{5}\)
- \(-24b^{10}-24b^{7}p-6b^{4}p^2\)
- \(50q^{13}-80q^{8}s+32q^{3}s^2\)
- \(-16p^{8}+56p^{6}-49p^{4}\)
- \(32b^{7}+80b^{5}s+50b^{3}s^2\)
- \(-64p^{9}+80p^{7}-25p^{5}\)
- \(54q^{4}-294q^{2}\)
- \(-3x^{6}-12x^{5}-12x^{4}\)
- \(-6b^{7}-108b^{6}-486b^{5}\)
Zonder de gemeenschappelijke factor af. Ontbind verder in factoren indien mogelijk.
Verbetersleutel
- \(98p^{9}-168p^{7}q+72p^{5}q^2=2p^{5}(49p^{4}-84p^2q+36q^2)=2p^{5}(7p^2-6q)^2\)
- \(-12x^{14}-12x^{9}-3x^{4}=-3x^{4}(4x^{10}+4x^5+1)=-3x^{4}(2x^5+1)^2\)
- \(72b^{7}+24b^{6}+2b^{5}=2b^{5}(36b^{2}+12b+1)=2b^{5}(6b+1)^2\)
- \(-216y^{11}+360y^{8}-150y^{5}=-6y^{5}(36y^{6}-60y^3+25)=-6y^{5}(6y^3-5)^2\)
- \(-24b^{10}-24b^{7}p-6b^{4}p^2=-6b^{4}(4b^{6}+4b^3p+p^2)=-6b^{4}(2b^3+p)^2\)
- \(50q^{13}-80q^{8}s+32q^{3}s^2=2q^{3}(25q^{10}-40q^5s+16s^2)=2q^{3}(5q^5-4s)^2\)
- \(-16p^{8}+56p^{6}-49p^{4}=-p^{4}(16p^{4}-56p^2+49)=-p^{4}(4p^2-7)^2\)
- \(32b^{7}+80b^{5}s+50b^{3}s^2=2b^{3}(16b^{4}+40b^2s+25s^2)=2b^{3}(4b^2+5s)^2\)
- \(-64p^{9}+80p^{7}-25p^{5}=-p^{5}(64p^{4}-80p^2+25)=-p^{5}(8p^2-5)^2\)
- \(54q^{4}-294q^{2}=6q^{2}(9q^{2}-49)=6q^{2}(3q+7)(3q-7)\)
- \(-3x^{6}-12x^{5}-12x^{4}=-3x^{4}(x^2+4x+4)=-3x^{4}(x+2)^2\)
- \(-6b^{7}-108b^{6}-486b^{5}=-6b^{5}(b^2+18b+81)=-6b^{5}(b+9)^2\)
Oefeningengenerator
wiskundeoefeningen.be 2026-01-14 23:11:03 Een site van Busleyden Atheneum Mechelen