Ontbind in factoren door gebruik te maken van merkwaardige producten
- \(36-25s^{4}\)
- \(100a^{10}+260a^5b+169b^2\)
- \(p^2+2p+1\)
- \(a^2-26a+169\)
- \(169b^{4}+312b^2+144\)
- \(9q^2-16p^{4}\)
- \(100b^{12}-1\)
- \(a^2-121\)
- \(169x^{6}-312x^3y+144y^2\)
- \(121s^2-220s+100\)
- \(196-169b^{12}\)
- \(1-169p^{14}\)
Ontbind in factoren door gebruik te maken van merkwaardige producten
Verbetersleutel
- \(36-25s^{4}=(6-5s^2)(6+5s^2)\)
- \(100a^{10}+260a^5b+169b^2=(10a^5+13b)^2\)
- \(p^2+2p+1=(p+1)^2\)
- \(a^2-26a+169=(a-13)^2\)
- \(169b^{4}+312b^2+144=(13b^2+12)^2\)
- \(9q^2-16p^{4}=(3q-4p^2)(3q+4p^2)\)
- \(100b^{12}-1=(10b^6+1)(10b^6-1)\)
- \(a^2-121=(a-11)(a+11)\)
- \(169x^{6}-312x^3y+144y^2=(13x^3-12y)^2\)
- \(121s^2-220s+100=(11s-10)^2\)
- \(196-169b^{12}=(14-13b^6)(14+13b^6)\)
- \(1-169p^{14}=(1-13p^7)(1+13p^7)\)
Oefeningengenerator
wiskundeoefeningen.be 2026-05-26 08:54:46 Een site van Busleyden Atheneum Mechelen