Find he zeroes of quadrstic polynomial h(t) =t2 —3
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Answered by
0
Answer: T-square-3=0
T2=3
t=3root2
Step-by-step explanation:
Answered by
3
Given,
h(t) = t
2 – 15 = t2 +(0)t – 15
To find the zeros, we put h(t) = 0
⇒ t
2 – 15 = 0
⇒ (t + √15)(t - √15)= 0
This gives us 2 zeros, for
t = √15 and t = -√15
Hence, the zeros of the quadratic equation are √15 and -√15.
Now, for verification
Sum of zeros = - coefficient of t / coefficient of t2
√15 + (-√15) = - (0) / 1
0 = 0
Product of roots = constant / coefficient of t2
√15 x (-√15) = -15/1
-15 = -15
Therefore, the relationship between zeros and their coefficients is verified.
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