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t=2 ആണെങ്കിൽ x=t²+ 2, y=4t-5, z=2t²-6t² എന്നീ കരുതലുള്ള കർവിൽ ഉള്ള യൂണിറ്റ് ടാൻജന്റ വെക്ടർ ആണ്

A113(i+j+k)\frac{11}{\sqrt 3}(i+j+k)

B25(2i+j+k)\frac{2}{\sqrt 5}(2i+j+k)

C13(2i+2j+k)\frac{1}{3}(2i+2j+k)

D113(i+j+k)\frac{11}{3}(i+j+k)

Answer:

13(2i+2j+k)\frac{1}{3}(2i+2j+k)

Read Explanation:

Given curve:
x=t2+2,y=4t5,z=2t26tx = t^2 + 2,\quad y = 4t - 5,\quad z = 2t^2 - 6t

Position vector

r(t)=(t2+2),i+(4t5),j+(2t26t),k\vec{r}(t) = (t^2 + 2),i + (4t - 5),j + (2t^2 - 6t),k

Differentiate to get tangent vector

drdt=(2t),i+(4),j+(4t6),k\frac{d\vec{r}}{dt} = (2t),i + (4),j + (4t - 6),k

At (t = 2)

=(2×2)i+4j+(4×26)k= (2×2)i + 4j + (4×2 - 6)k
=4i+4j+(86)k= 4i + 4j + (8 - 6)k
=4i+4j+2k= 4i + 4j + 2k

Magnitude

v=42+42+22|\vec{v}| = \sqrt{4^2 + 4^2 + 2^2}
=16+16+4= \sqrt{16 + 16 + 4}
=36=6= \sqrt{36} = 6

Unit tangent vector

T^=16(4i+4j+2k)\hat{T} = \frac{1}{6}(4i + 4j + 2k)

Simplify:
=13(2i+2j+k)= \frac{1}{3}(2i + 2j + k)
Final Answer:
13(2i+2j+k)\boxed{\frac{1}{3}(2i + 2j + k)}

Related Questions:

a\overset{\rightarrow}{a} ഉം b\overset{\rightarrow}{b} ഉം കോൺസ്റ്റന്റ് വെക്ടറുകളും r=ae5t+be5t\overset {\rightarrow}{r}=\overset{\rightarrow}{a}e^{5t}+ \overset{\rightarrow}{b}e^{-5t} ഉം ആണെങ്കിൽd2rdt225r \frac{d^2r}{dt^2}-25r ആണ്

Which among the following statements is/are not true?

I) The sum of opposite angles of a parallelogram is 180

II) The sum of adjacent angles of a parallelogram is 180

III) The opposite sides of a parallelogram are equal

IV) The sum of the inner angles of a parallelogram is 360

In the figure, a square is joined to a regular pentagon and a regular hexagon. The measure of BAC is :

image.png

In the figure, BC is a chord and PA is a tangent to the circle. PB = 4 cm, PA = 6 cm the length of the chord BC is :

image.png
താഴെക്കൊടുത്തിരിക്കുന്നവയിൽ ഏതാണ് 2i+4j+5k യുടെ യൂണിറ്റ് വെക്ടർ ?