If the product of the zeros of the polynomial f(x) = ax³ − 6x² + 11x − 6 is 4, find the value of a
Video Explanation
Watch the video explanation below:
Given
f(x) = ax³ − 6x² + 11x − 6
Product of the zeros = 4
To Find
The value of a.
Solution
For a cubic polynomial:
ax³ + bx² + cx + d
Product of zeros = −d / a
Step 1: Identify a and d
Comparing f(x) = ax³ − 6x² + 11x − 6 with ax³ + bx² + cx + d,
a = a, d = −6
Step 2: Use the Formula for Product of Zeros
Product of zeros = −d / a
= −(−6) / a
= 6 / a
Step 3: Use the Given Condition
6 / a = 4
6 = 4a
a = 3/2
Final Answer
a = 3/2
Conclusion
Hence, if the product of the zeros of the polynomial f(x) = ax³ − 6x² + 11x − 6 is 4, then the value of a is 3/2.