Ufumbuzi - Kutatua equations za quadratic kwa kukamilisha mraba

Tumia fomu standard ya equation ya quadratic, $$a{x}^2+bx+c=0$$, ili kupata coefficients:

$$2x^2-51=0$$

$$a=2$$
$$b=0$$
$$c=-51$$

Kwa sababu $$a=2$$, gawa coefficients zote na constants kwa pande zote za equation na $$2$$:

$$2x^2+0x-51=0$$

$$\frac{2}{2}{x}^2+0\frac{x}{2}-\frac{51}{2}=\frac{0}{2}$$

$$x^2+0x-\frac{51}{2}=0$$

Vigawanyaji ni:
$$a=1$$
$$b=0$$
$$c=-\frac{51}{2}$$

Ongeza $$\frac{51}{2}$$ kwa pande zote za equation:

$$x^2+0x-\frac{51}{2}=0$$

$$x^2+0x-\frac{51}{2}+\frac{51}{2}=0+\frac{51}{2}$$

$$x^2+0x=\frac{51}{2}$$

Ili kufanya upande wa kushoto wa equation kuwa perfect square trinomial, ongeza constant mpya sawa na $${\left(\frac{b}{2}\right)}^2$$ kwa equation:

$$b=0$$

Ongeza $$0$$ kwa pande zote za equation:

$$x^2+0x=\frac{51}{2}$$

$$x^2+0x+0=\frac{51}{2}+0$$

Sasa tuna perfect square trinomial, tunaweza kuandika kama fomu ya perfect square kwa kuongezea nusu ya coefficient ya $$b$$, $$\frac{b}{2}$$:
$$b=0$$

$$x^2+0x+0=\frac{51}{2}$$

$${\left(x+0\right)}^2=\frac{51}{2}$$

Chukua square root ya pande zote za equation: IMPORTANT: Wakati wa kutafuta square root ya constant, tunapata solutions mbili: positive na negative

$${\left(x+0\right)}^2=\frac{51}{2}$$

$$\sqrt{{\left(x+0\right)}^2}=\sqrt{\frac{51}{2}}$$

$$x+0=\pm \sqrt{\frac{51}{2}}$$

$$x+0+0=\pm \sqrt{\frac{51}{2}}$$

$$x=\pm \sqrt{\frac{51}{2}}$$

$$x=0\pm \frac{\sqrt{51}}{\sqrt{2}}$$

$$x=0\pm \frac{\sqrt{51}·\sqrt{2}}{\sqrt{2}·\sqrt{2}}$$

$$x=0\pm \frac{\sqrt{102}}{2}$$

$$x_1=0+\frac{\sqrt{102}}{2}$$
$$x_2=0-\frac{\sqrt{102}}{2}$$