Question 22

Find the zeroes of the following polynomials by factorisation method and verify the relations between the zeroes and the coefficients of the polynomials
(ix) $y^2+(\frac{3}{}\sqrt{\mathrm{5/2)}}y-5$

Solution:

To find the zeroes of the polynomial $y^2+(\frac{3}{}\sqrt{\mathrm{5/2)}}y-5$ using the factorization method, we will follow these steps:

Step 1: Write the polynomial in standard form
We start with the polynomial:
$$y2+(3\surd 5/2)y-5=0$$

Step 2: Identify coefficients
Here, we identify the coefficients:
– $$a=1$$ (coefficient of $${\mathrm{y2}}^{}$$)
– $$b=\frac{3}{}\sqrt{\mathrm{5/2}}$$ (coefficient of $$y$$)
– $$c=-5$$ (constant term)

Step 3: Use the middle-term splitting method
We need to express the middle term $$\frac{3}{}\sqrt{5}\mathrm{y/2}$$ in a way that allows us to factor the polynomial. We look for two numbers that multiply to $$ac=1\times (-5)=-5$$ and add up to $$b=\frac{3}{}\sqrt{\mathrm{5/2}}$$.

The two numbers that satisfy these conditions are $$2\sqrt{5}$$ and $$-\frac{\mathrm{5/}}{2}$$.

Step 4: Rewrite the polynomial
We can rewrite the polynomial as:
$${\mathrm{y2}}^{}+2\sqrt{5}y-\frac{5}{}\mathrm{y/2}-5=0$$

Step 5: Factor by grouping
Now we group the terms:
$$({\mathrm{y2}}^{}+2\sqrt{5}y)+(-\frac{5}{}\mathrm{y/2}-5)=0$$
Factoring out common terms:
$$y(y+2\sqrt{5})-\frac{\mathrm{5/}}{2}(y+2\sqrt{5})=0$$
Now we can factor out $$(y+2\sqrt{5})$$:
$$(y-\frac{\mathrm{5/}}{2})(y+2\sqrt{5})=0$$

Step 6: Find the zeroes
Setting each factor to zero gives us:
1. $$y-\frac{\mathrm{5/}}{2}=0$$ → $$y=\frac{\mathrm{5/}}{2}$$
2. $$y+2\sqrt{5}=0$$ → $$y=-2\sqrt{5}$$

Thus, the zeroes of the polynomial are:
$$y=\frac{\mathrm{5/}}{2}\text{and}y=-2\sqrt{5}$$

Step 7: Verify the relations between the zeroes and coefficients
Let $$\alpha =\frac{\mathrm{5/}}{2}$$ and $$\beta =-2\sqrt{5}$$.

1. Sum of the zeroes:
$$\alpha +\beta =\frac{\mathrm{5/}}{2}-2\sqrt{5}$$
We need to check if this equals $$-\frac{\mathrm{b/}}{a}$$:
$$-\frac{\mathrm{b/}}{a}=-(\frac{3}{\sqrt{\mathrm{5/2)/}}}=-\frac{3}{}\sqrt{\mathrm{5/2}}$$

2. Product of the zeroes:
$$\alpha \beta =\left(\frac{\mathrm{5/}}{2}\right)(-2\sqrt{5})=-5\sqrt{5}$$
We need to check if this equals $$\frac{c}{a}$$:
$$\frac{\mathrm{c/}}{a}=\frac{-}{\mathrm{5/}}=-5$$

Conclusion
The zeroes of the polynomial $y^2+(\frac{3}{}\sqrt{\mathrm{5/2)}}y-5$ are $$\frac{\mathrm{5/}}{2}$$ and $$-2\sqrt{5}$$. The relations between the zeroes and coefficients are verified.