Find the differenital equation for the c...

Find the differenital equation for the curve `y=k(x-k)^(2)` for all values of `k`.

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A normal is drawn at a point P(x,y) of a curve.It meets the x-axis at Q. If PQ has constant length k, then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^(2)-y^(2)). Find the equation of such a curve passing through (0,k).

A normal is drwn at a point P(x,y) of a curve. It meets the x-axis at Q. If PQ is of constant length k, then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^(2)-y^(2)) . Find the equation of such a curve passing through (0,k).

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

If the line y=2x+k is a tangent to the curve x^(2)=4y , then the value of k is -

If the line x + y = k is a normal to the curve y2 = 12x, find the value of k.

Recommended Questions

Find the differenital equation for the curve y=k(x-k)^(2) for all valu...
Text Solution
|
If the system of equation (k+1)^(3)x+(k+2)^(3)y=(k+3)^(3),(k+1)x+(k+2)...
Text Solution
|
If the point (k,k^(2)) lies on the graph of the equation x+y=6, then f...
Text Solution
|
If x=k^2 and y=k is a solution of the equation x-5y+6=0 then find the ...
Text Solution
|
Find the differenital equation for the curve y=k(x-k)^(2) for all valu...
Text Solution
|
वक्र y=k(x-k)^(2) का k के समस्त मानों के लिए अवकल समीकरण बनाइए ।
Text Solution
|
यदि x=k^(2) तथा y=k समीकरण x-5y+6=0 का एक हल हो, तो k का मान ज्ञात क...
Text Solution
|
Find the value of k, so that the length of the subnormal at any point ...
Text Solution
|
k का मान ज्ञात कीजिए यदि निम्न समीकरण का हल विद्यमान हो x+y-3=0,(1+k)x...
Text Solution
|