Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(100p^{8}-169x^2\)
- \(36y^2-25s^{14}\)
- \(256b^{10}-9\)
- \(25b^2-70b+49\)
- \(121a^{10}-176a^5+64\)
- \(y^2-28y+196\)
- \(p^2-25\)
- \(81b^{16}-1\)
- \(169b^{8}-25\)
- \(121s^{10}-81x^2\)
- \(a^2-10a+25\)
- \(9b^{8}-48b^4x+64x^2\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(100p^{8}-169x^2=(10p^4+13x)(10p^4-13x)\)
- \(36y^2-25s^{14}=(6y-5s^7)(6y+5s^7)\)
- \(256b^{10}-9=(16b^5+3)(16b^5-3)\)
- \(25b^2-70b+49=(5b-7)^2\)
- \(121a^{10}-176a^5+64=(11a^5-8)^2\)
- \(y^2-28y+196=(y-14)^2\)
- \(p^2-25=(p-5)(p+5)\)
- \(81b^{16}-1=(9b^8+1)(9b^8-1)\)
- \(169b^{8}-25=(13b^4+5)(13b^4-5)\)
- \(121s^{10}-81x^2=(11s^5+9x)(11s^5-9x)\)
- \(a^2-10a+25=(a-5)^2\)
- \(9b^{8}-48b^4x+64x^2=(3b^4-8x)^2\)
Oefeningengenerator
wiskundeoefeningen.be 2025-12-27 07:23:02 Een site van Busleyden Atheneum Mechelen