Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(y^2-9\)
- \(81-196b^{16}\)
- \(144b^{4}+24b^2+1\)
- \(1-16p^{4}\)
- \(49a^{8}-169\)
- \(-49b^2+64\)
- \(y^2+16y+64\)
- \(-49x^2+100\)
- \(225p^{8}+210p^4y+49y^2\)
- \(196s^2-225p^{14}\)
- \(4q^{8}-169x^2\)
- \(169a^{4}+234a^2+81\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(y^2-9=(y-3)(y+3)\)
- \(81-196b^{16}=(9-14b^8)(9+14b^8)\)
- \(144b^{4}+24b^2+1=(12b^2+1)^2\)
- \(1-16p^{4}=(1-4p^2)(1+4p^2)\)
- \(49a^{8}-169=(7a^4+13)(7a^4-13)\)
- \(-49b^2+64=(8-7b)(8+7b)\)
- \(y^2+16y+64=(y+8)^2\)
- \(-49x^2+100=(10-7x)(10+7x)\)
- \(225p^{8}+210p^4y+49y^2=(15p^4+7y)^2\)
- \(196s^2-225p^{14}=(14s-15p^7)(14s+15p^7)\)
- \(4q^{8}-169x^2=(2q^4+13x)(2q^4-13x)\)
- \(169a^{4}+234a^2+81=(13a^2+9)^2\)