Last updated at Dec. 16, 2024 by Teachoo
Question 3 The tangent to the curve given by x = et . cost, y = et . sint at t = π/4 makes with x-axis an angle: 0 (B) π/4 (C) π/3 (D) π/2 Given curve π=π^π.ππππ and π=π^π.ππππ Finding slope of tangent π π/π π=(π π/π π)/(π π/π π) π=π^π.ππππ Differentiating π₯ π€.π.π‘ π‘ ππ₯/ππ‘=π^π‘ πππ π‘βπ^π‘ π πππ‘ π π/π π=π^π‘ (πππ π‘βπ πππ‘) π=π^π.ππππ Differentiating y π€.π.π‘ ππ¦/ππ‘=π^π‘ π πππ‘+π^π‘ πππ π‘ π π/π π=π^π‘ (π πππ‘\+πππ π‘) Now, π π/π π=(π π/π π)/(π π/π π) ππ¦/ππ₯=(π^π‘ (π πππ‘\+πππ π‘)" " )/(π^π‘ (πππ π‘βπ πππ‘)" " ) ππ¦/ππ₯=( (ππππ\+ππππ)" " )/( (ππππβππππ)" " ) Putting π=π/π β π π/π πβ€|_(π=π /π)=( (π ππ π/4 \+ πππ π/4)" " )/( (πππ π/4 β π ππ π/4)" " ) = (1/β2+1/β2)/(1/β2β1/β2) = (2/(β2))/0 = β Let π½ be the angle made by tangent with the π₯- axis. Slope = πππ§β‘π½ β = tanβ‘π tanβ‘γπ=βγ β΄ π½= π /π So, the correct answer is (D)
NCERT Exemplar - MCQs
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About the Author
Davneet Singh has done his B.Tech from Indian Institute of Technology, Kanpur. He has been teaching from the past 14 years. He provides courses for Maths, Science and Computer Science at Teachoo