0
You visited us 0 times! Enjoying our articles? Unlock Full Access!
Question

"\\( A ( - 3 , - 1 ) \\) is a point on the curve \\( 2 x ^ { 2 } - x y + 3 y ^ { 2 } = 18 \\). The length of the tangent to the curve at \\( A \\) is\n\\( \\begin{array} { l l l l } { \\text { (A) } 130 / 11 } & { \\text { (B) } \\sqrt { 130 } / 11 } & { \\text { (C) } \\sqrt { 130 } / 11 } & { \\text { (D) none } } \\end{array} \\)"

Solution
Verified by Toppr


Was this answer helpful?
0
Similar Questions
Q1
A(-3,-1) is a point on the curve 2x2xy+3y2=18. The equation of the normal to the curve at A is
View Solution
Q2
Find the slope of the normal to the curve 2x2xy+3y2=18 at (3,1).
View Solution
Q3
Write the equation of tangent at (1, 1) on the curve 2x2+3y2=5.
View Solution
Q4
The slope of the tangent at (1,6) on the curve 2x2+3y2=5 is
View Solution
Q5
Find the slope of the tangent and the normal to the curve $$2{x}^{2}+4y-3{y}^{2}=3$$ at $$\left(-1,1\right)$$
View Solution