Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(256y^{8}-160y^4+25\)
- \(b^2+16b+64\)
- \(100p^{10}-260p^5x+169x^2\)
- \(4q^{4}+4q^2+1\)
- \(16s^{6}-24s^3+9\)
- \(1-81p^{14}\)
- \(196-169a^{8}\)
- \(-81s^2+16\)
- \(169p^{10}-130p^5+25\)
- \(169-49x^{4}\)
- \(s^2-26s+169\)
- \(256s^2-160s+25\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(256y^{8}-160y^4+25=(16y^4-5)^2\)
- \(b^2+16b+64=(b+8)^2\)
- \(100p^{10}-260p^5x+169x^2=(10p^5-13x)^2\)
- \(4q^{4}+4q^2+1=(2q^2+1)^2\)
- \(16s^{6}-24s^3+9=(4s^3-3)^2\)
- \(1-81p^{14}=(1-9p^7)(1+9p^7)\)
- \(196-169a^{8}=(14-13a^4)(14+13a^4)\)
- \(-81s^2+16=(4-9s)(4+9s)\)
- \(169p^{10}-130p^5+25=(13p^5-5)^2\)
- \(169-49x^{4}=(13-7x^2)(13+7x^2)\)
- \(s^2-26s+169=(s-13)^2\)
- \(256s^2-160s+25=(16s-5)^2\)
Oefeningengenerator
wiskundeoefeningen.be 2026-04-14 21:55:31 Een site van Busleyden Atheneum Mechelen