Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(64b^{6}-25\)
- \(25y^2-36x^{4}\)
- \(100a^{4}-1\)
- \(256x^{12}-9\)
- \(121p^{10}+330p^5x+225x^2\)
- \(49-144s^{10}\)
- \(y^2-1\)
- \(25p^{6}-169x^2\)
- \(b^2+12b+36\)
- \(y^2+16y+64\)
- \(64p^{8}-240p^4+225\)
- \(196y^{4}-364y^2+169\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(64b^{6}-25=(8b^3+5)(8b^3-5)\)
- \(25y^2-36x^{4}=(5y-6x^2)(5y+6x^2)\)
- \(100a^{4}-1=(10a^2+1)(10a^2-1)\)
- \(256x^{12}-9=(16x^6+3)(16x^6-3)\)
- \(121p^{10}+330p^5x+225x^2=(11p^5+15x)^2\)
- \(49-144s^{10}=(7-12s^5)(7+12s^5)\)
- \(y^2-1=(y-1)(y+1)\)
- \(25p^{6}-169x^2=(5p^3+13x)(5p^3-13x)\)
- \(b^2+12b+36=(b+6)^2\)
- \(y^2+16y+64=(y+8)^2\)
- \(64p^{8}-240p^4+225=(8p^4-15)^2\)
- \(196y^{4}-364y^2+169=(14y^2-13)^2\)
Oefeningengenerator
wiskundeoefeningen.be 2026-03-01 18:29:59 Een site van Busleyden Atheneum Mechelen