Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(100a^{6}-169p^2\)
- \(9p^{6}-4q^2\)
- \(16x^{4}-25\)
- \(144a^{16}-169b^2\)
- \(-4b^2+1\)
- \(49q^2-64p^{10}\)
- \(36p^2-132p+121\)
- \(81-196y^{16}\)
- \(q^2-24q+144\)
- \(225p^{4}-330p^2y+121y^2\)
- \(4q^{8}+4q^4y+1y^2\)
- \(121x^{10}+66x^5+9\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(100a^{6}-169p^2=(10a^3+13p)(10a^3-13p)\)
- \(9p^{6}-4q^2=(3p^3+2q)(3p^3-2q)\)
- \(16x^{4}-25=(4x^2+5)(4x^2-5)\)
- \(144a^{16}-169b^2=(12a^8+13b)(12a^8-13b)\)
- \(-4b^2+1=(1-2b)(1+2b)\)
- \(49q^2-64p^{10}=(7q-8p^5)(7q+8p^5)\)
- \(36p^2-132p+121=(6p-11)^2\)
- \(81-196y^{16}=(9-14y^8)(9+14y^8)\)
- \(q^2-24q+144=(q-12)^2\)
- \(225p^{4}-330p^2y+121y^2=(15p^2-11y)^2\)
- \(4q^{8}+4q^4y+1y^2=(2q^4+y)^2\)
- \(121x^{10}+66x^5+9=(11x^5+3)^2\)
Oefeningengenerator
wiskundeoefeningen.be 2026-05-27 19:05:01 Een site van Busleyden Atheneum Mechelen