Question: A polynomial $ f(x) $ satisfies $ f(x + 1) - f(x) = 6x + 4 $. Find the leading coefficient of $ f(x) $. - GetMeFoodie
Understanding Polynomials Through Difference: Finding the Leading Coefficient from a Functional Equation
Understanding Polynomials Through Difference: Finding the Leading Coefficient from a Functional Equation
Polynomials have predictable behaviors under shifts, making them ideal candidates for analyzing sequences and recursive relations. One powerful technique in algebra involves examining the difference $ f(x+1) - f(x) $, which reveals key insights about the degree and leading coefficient of a polynomial $ f(x) $. In this article, we explore a specific case: a polynomial $ f(x) $ satisfying the equation
$$
f(x + 1) - f(x) = 6x + 4,
$$
and we determine its leading coefficient.
Understanding the Context
The Meaning of the Functional Equation
The expression $ f(x+1) - f(x) $ is known as the first difference of $ f $. For any polynomial of degree $ n $, this difference results in a polynomial of degree $ n-1 $. Since the given difference is a linear polynomial, $ 6x + 4 $, it is of degree 1. This implies that $ f(x) $ must be a quadratic polynomial β a degree-2 polynomial.
So, we assume:
$$
f(x) = ax^2 + bx + c,
$$
where $ a, b, c $ are constants to be determined.
Image Gallery
Key Insights
Compute $ f(x+1) - f(x) $
We compute $ f(x+1) $ by substituting $ x+1 $ into the polynomial:
$$
f(x+1) = a(x+1)^2 + b(x+1) + c = a(x^2 + 2x + 1) + b(x + 1) + c = ax^2 + 2ax + a + bx + b + c.
$$
Simplifying:
$$
f(x+1) = ax^2 + (2a + b)x + (a + b + c).
$$
Now subtract $ f(x) = ax^2 + bx + c $:
$$
f(x+1) - f(x) = [ax^2 + (2a + b)x + (a + b + c)] - [ax^2 + bx + c] = (2a + b - b)x + (a + b + c - c) = 2a x + (a + b).
$$
We are told this equals $ 6x + 4 $. Therefore, matching coefficients:
- Coefficient of $ x $: $ 2a = 6 $ β $ a = 3 $,
- Constant term: $ a + b = 4 $. Substituting $ a = 3 $, we get $ 3 + b = 4 $ β $ b = 1 $.
So the polynomial is:
$$
f(x) = 3x^2 + x + c,
$$
where $ c $ is arbitrary β this constant determines the vertical shift and does not affect the difference.
π Related Articles You Might Like:
π° stanford women's soccer π° how did george harrison die π° oscars las vegas π° Senior Sunrise Secrets How This Morning Glow Boosts Your Day Forever 5163037 π° Usd Acceptance Rate 7850647 π° Sonos App For Macbook 4285112 π° Oracle Cloud Free Vm 4892175 π° Gpu Caps Viewer π° Dept Health Human Services π° Yahoo Says Shock As Dollar General Outperforms In Retail Giant Rankings 467214 π° Health Insurance Stock 3845815 π° House Phone Verizon 479856 π° Comex Copper Price π° The Ultimate Sandwich Spread That Woodswallow Millions Sales Soaring 7005850 π° Basis Definition Math π° Transform Your Avatar With The Fierce Meru Succubus Mc Skindont Miss Out 9086319 π° Match Excel Formula 457237 π° 10 Eye Watering Shrimp Skewers Thatll Make You Race To The Grill 759007Final Thoughts
Identifying the Leading Coefficient
The leading coefficient is the coefficient of the highest-degree term, which in this case is $ 3 $ (the coefficient of $ x^2 $).
Thus, the leading coefficient of $ f(x) $ is $ 3 $.
A Deeper Algebraic Insight
This result illustrates a fundamental principle in finite calculus: the leading coefficient of a polynomial is directly tied to the leading coefficient of its first difference. Specifically, if $ f(x+1) - f(x) = px + q $, then $ f(x) $ is quadratic with leading coefficient $ rac{p}{2} $. Here, $ p = 6 $, so $ rac{6}{2} = 3 $, confirming our calculation.
This technique is valuable in algorithm analysis, signal processing, and discrete modeling β fields where understanding polynomial growth from incremental changes reveals underlying structure.
Conclusion
Given the functional equation $ f(x+1) - f(x) = 6x + 4 $, we deduced $ f(x) $ is a quadratic polynomial. By computing the difference and matching coefficients, we found the leading coefficient is $ 3 $. This approach not only solves the problem efficiently but also exemplifies a powerful method in algebraic problem-solving.
