A curve passes through point (2,3). Any tangent line between its two axes is bisected by the tangent point. The equation of this line is obtained

Find the equation for this line

RELATED INFORMATIONS

1. When a curve passes through a point (2,3), any line segment between two coordinate axes is bisected by tangent point
2. Find the curve of a point (1, - 1) so that the tangent line at any point on the curve is bisected by the tangent line
3. It is proved that the length of the line segment between two coordinate axes of the tangent at any point on the curve X ^ 2 / 3 + y ^ 2 / 3 = a ^ 2 / 3 (note a > 0 constant, 2 / 3 is power) is fixed
4. The normal equation of a curve at a certain point Finding the normal equation of the curve y = e ^ - 2x at M (0,1) The answer is y '= - 2E ^ - 2x, so the tangent slope is - 2, so the normal slope is - 1 / (tangent slope) = 1 / 2 So the normal equation Y-1 = 1 / 2 (x-0) I don't know why "so normal slope is - 1 / (tangent slope) = 1 / 2" I don't know who can help me popularize the concept of normals and general methods
5. The normal equation of curve y = x ^ 2 + 1 at point (1,2) is?
6. Finding the normal equation The normal equation of y = x ^ 3-x + 5 at point m (0,5)
7. Given that a curve is located on the right side of the Y-axis and passes through the point (1.1), the intercept of the tangent at any point on the curve on the y-axis is equal to the abscissa of the tangent point, the curve equation is obtained
8. It is known that ⊙ o is a circle with the origin as the center and √ 2 as the radius. The point P is a point on the straight line y = - x + 6. Through P, make a tangent PQ of ⊙ o, and Q is the tangent point. Then the minimum value of the tangent length PQ is
9. Make the tangent of circle (x - 6) ^ 2 + y ^ 2 = 4 through origin 0, then the tangent length is
10. Make the tangent of the circle (X-6) 2 + y2 = 4 through the origin O & nbsp;, and the length of the tangent is______ ．
11. A curve on the xoy plane passes through the point (2,3), and any line segment between the two coordinate axes is bisected by the tangent point According to the meaning of the topic, the intercept of the tangent of the curve at the point (x, y) on the two coordinate axes should be 2x and 2Y How do we get the intercept 2x and 2Y?
12. When a curve passes through a point (2,3), any line segment between two coordinate axes is bisected by the tangent point?
13. If the tangent equation of the curve equation f (x) = x & # 179; + 2x & # 178; - 3x at x0 is parallel to 2x-y-1 = 0, then the coordinates of the tangent point and the tangent equation at this point
14. The number of divisors of a number is______ Of which the smallest divisor is______ The greatest divisor is______ ．
15. The quotient of sixteen divided by four fifths minus four fifths of a number is twelve
16. If three points a (2,2), B (a, 0), C (0, b) (AB ≠ 0) are collinear, then the value of 1A + 1b is equal to______
17. The method of summation of general terms of a sequence of numbers requires one or two examples Do not A1, A2, such as to see too much trouble, the best is the picture and so on. To add 1, 2 typical examples to the method! The standard alphanumeric is the same as the textbook. PEP B version. I'm from Shandong
18. If the curve represented by the equation x2 + Y2 + DX + ey + F = 0 (D2 + e2-4f > 0) is symmetric with respect to the straight line y = x, then there must be () A. D=EB. D=FC. E=FD. D=E=F
19. Calculate determinants 1, 2 n-1 n 2 3 … n 1 … … … … … n-1 n 1 Calculate determinants 1, 2 n-1 n 2 3 … n 1 … … … … … n-1 n 1 … n-2 n 1 2 … n-1
20. If a two digit number has 6 divisors and the sum of the smallest 3 divisors is 10, then the number is