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The gradient of the curve y = ax² + bx at the point (3, 3) is 4. Find the value of a and the value of b.​

User Milestyle
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1 Answer

14 votes
14 votes

The curve passes through the point (3, 3), so
y=3 when
x=3. Then


y = ax^2 + bx \implies 3 = 9a + 3b \implies 3a + b = 1

The tangent line to the curve at (3, 3) has gradient
(dy)/(dx) at
x=3. Compute the derivative.


y = ax^2 + bx \implies (dy)/(dx) = 2ax + b

Then when
x=3, the gradient is 4, so


2ax + b = 4 \implies 6a+b=4

Solve for
a and
b. Eliminating
b, we find


(6a+b) - (3a+b) = 4-1 \implies 3a = 3 \implies \boxed{a=1}

and it follows that


3 + b = 1 \implies \boxed{b = -2}

User FrenchTechLead
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