Focal chord of y 2 16x is a tangent
WebFocal chord to y2=16x is tangent to x−62+y2=2 then the. Focal chord to y2 =16x is tangent to (x−6)2+y2 =2 then the possible values of the slopes of this chord (s),are. … Web2) are the endpoints of a focal chord then t 1 t 2 = −1. (2) Tangents at endpoints of a focal chord are perpendicular and hence intersect on directrix. (3) Length of a focal chord of y2 = 4ax, making an angle αwith the X-axis, is 4acosec2α. (4) If AB is a focal chord of y2 = 4ax, then , where S is the focus. Recall
Focal chord of y 2 16x is a tangent
Did you know?
WebDec 1, 2024 · Focal chord of the parabola is tangent to the circle (x−6)^2+y^2=2. 2and (6,0) are radius and centre of the circle As radius is perpendicular to the tangent, we have length of tangent from (4,0) to the circle is = 2 . From the diagram, we have tan teta= 2/ 2=1⇒θ=45 Therefore, slope of the chord is ±1= (−1,1). Advertisement Answer WebFocal chord to y 2=16 x is tangent to x 62+ y 2=2 then the possible values of the slopes of this chords,areA. 1,1B. 2,2C. 2, 1/2D. 2, 1/2 Question Focal chord to y 2 = 16 x i s t a n g e n t t o ( x − 6 ) 2 + y 2 = 2 then the possible values of the slopes of this chord(s),are
WebJan 11, 2024 · The focal chord to y^2 = 16 x is tangent to (x - 6)^2 + y^2 = 2 , then the possible value of the slope of this chord, are. ← Prev Question Next Question →. 0 … WebA: y=-2sin3x+90∘y=-2cos3x ∵sin90+θ=cosθ Sketch two cycle of the given trigonometric… question_answer Q: Find the value of each variable using the given chord and secant lengths.
WebT is a point on the tangent to a parabola y 2 = 4ax at its point P. TL and TN are the perpendiculars on the focal radius SP and the directrix of the parabola respectively. Then. A. SL = 2 (TN) B. 3 (SL) = 2 (TN) C. ... Let PSQ be the focal chord of … WebMar 14, 2024 · It is given that the focal chord is tangent to the circle which means that the distance of the focal chord from the center of the circle is equal to the radius of the circle. Therefore, we get m x − y − 4 m 1 + m 2 = 2 Now we will put the value of x = 6 and y = 0 in the above equation, we get ⇒ 6 m − 0 − 4 m 1 + m 2 = 2
WebA chord which passes through the focus of a parabola is called a focal chord. A given chord will be a focal chord if the point \((0,a)\) lies on it. Substituting these coordinates into the equation of the chord above we have ... and substituting \(x=2ap\). In either case, the gradient of the tangent to \(x^2=4ay\) at the point \(P(2ap,ap^2 ...
WebThe focal chord of \( y^{2}=16 x \) is tangent to\( \mathrm{P} \) \( (x-6)^{2}+y^{2}=2 \). Then the possible values of theW slope of this chord are:(1) \( 1,... theramin trees redditWebClick here👆to get an answer to your question ️ The focal chord to y ^ 2 = 16 x is tangent to ( x - 6 ) ^ 2 + y ^ 2 = 2 then the possible values of the slope of this chord are Solve Study Textbooks Guides the ram inn arnoldWebJan 23, 2024 · Here, the focal chord to y2 =16x is tangent to circle (x−6)2+y2 =2 ⇒ focus of the parabola is (4,0) Now, tangent are drawn from (4,0) to (x−6)2+y2=2 Since, P A is tangent to circle and equals to 2 , (from diagram using distance formula) tanθ= slope of tangent =AP AC = 2 2 =1 or tanθ =BP BC =−1 ∴ Slope of focal chord as tangent to … signs he hates youWebLet P Q be a variable focal chord of the parabola y 2 = 4 a x where vertex is A. Locus of , ... The value λ such that line y = x + λ is tangent to the parabola y 2 = 8 x. Hard. View solution > P Q is a variable focal chord of the parabola y 2 = 4 a x whose vertex is A. signs he is flirting with youWebSOLUTION. Here, the focal chord of y2 =16x is tangent to circle (x−6)2+y2 = 2. ⇒ Focus of parabola as (a,0) i.e. (4,0) Now, tangents are drawn from (4,0) to (x−6)2+y2 = 2. Since, P … the ram in the pepper patchWebJan 23, 2024 · Solution For The focal chord to y2=16x is tangent to (x−6)2+y2=2, then the possible values of the slope of this chord, are The world’s only live instant tutoring platform. About Us Become a Tutor. Filo instant Ask button for chrome browser. Now connect to a tutor anywhere from the web ... signs he is head over heels for youWebThe equation of a common tangent to the curves, y 2=16x and xy=−4 is A x+y+4=0 B x−2y+16=0 C 2x−y+2=0 D x−y+4=0 Medium Solution Verified by Toppr Correct option is D) Step 1: Use slope form of tangent equation of parabola Equation of tangent to parabola y 2=4ax in terms of slope ’m’ is y=mx+ ma signs he is cheating on facebook