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Answers
3 y + 2 x = 3 - x₁² + 2 x₁
Given curve x^2 + 3 y - 3 = 0 --- (1)
Differentiate with respect to x for getting the slope of the tangent at point (x,y).
So 2 x + 3 y' = 0
So y' = - 2/3 x --- (2)
Thus the tangent to the curve at a point P (x₁, y₁) will be :
y = -2/3 x₁ + c or 3 y + 2 x = c --- (3)
As P is on curve (1), x₁² + 3 y₁ = 3 or 3
y₁ = 3 - x₁²
As P is on the tangent too,
3 - x₁² + 2 x₁ = c
Finally the equation of the tangent at P(x₁, y₁) :
3 y + 2 x = 3 - x₁² + 2 x₁
Answer:
Step-by-step explanation:
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Next similar questionQ)
Find the equation of the tangent to the curve \( x^2+3y=3\), which is parallel to the line y−4x+5=0
A)
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Equation of the tangent at (x1,y1) where slope is m is given by y−y1=m(x−x1)
Step 1:
Given curve is x2+3y=3
Let y=−x2+33
On differentiating with respect to x
∴dydx=13[−2x]
=−23x
Step 2:
Since the tangent is parallel to the line y−4x+5=0
Then slopes should be equal
Slope of the given line is 4
−2x3=4
x=−4×32
=−122
=−6
Step 3:
∴y=−(−6)2+33
=−36+33
=−333
=−11
Hence the points of contact are (−6,−11)
Step 4:
Equation of the tangent at (x1,y1) where slope is m is given by y−y1=m(x−x1)
(i.e)[y−(−11)]=4(x−(−6))
y+11=4x+6
⇒4x−y=11−6
⇒4x−y=5
Hence 4x−y=5 is the required equation.
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