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In ∆ABC, if a = 13, b = 14, c = 15, then find the value of cos B
Concept: Solutions of Triangle
In ∆ABC, prove that `(cos 2"A")/"a"^2 - (cos 2"c")/"c"^2 = 1/"a"^2 - 1/"c"^2`
Concept: Solutions of Triangle
In ∆ABC, if `(2cos "A")/"a" + (cos "B")/"b" + (2cos"C")/"c" = "a"/"bc" + "b"/"ca"`, then show that the triangle is a right angled
Concept: Solutions of Triangle
In ∆ABC, prove that `sin ((A - B)/2) = ((a - b)/c) cos C/2`
Concept: Solutions of Triangle
In ΔABC, prove that `("a"^2sin("B" - "C"))/(sin"A") + ("b"^2sin("C" - "A"))/(sin"B") + ("c"^2sin("A" - "B"))/(sin"C")` = 0
Concept: Solutions of Triangle
In ΔABC, prove that `("b"^2 - "c"^2)/"a" cos"A" + ("c"^2 - "a"^2)/"b" cos"B" + ("a"^2 - "b"^2)/"c" cos "C"` = 0
Concept: Solutions of Triangle
Find the principal solutions of cot θ = 0
Concept: Trigonometric Equations and Their Solutions
Find the cartesian co-ordinates of the point whose polar co-ordinates are `(1/2, π/3)`.
Concept: Solutions of Triangle
If 2 tan–1(cos x) = tan–1(2 cosec x). then find the value of x.
Concept: Trigonometric Equations and Their Solutions
Find the general solution of sin θ + sin 3θ + sin 5θ = 0
Concept: Trigonometric Equations and Their Solutions
If a line drawn from the point A( 1, 2, 1) is perpendicular to the line joining P(1, 4, 6) and Q(5, 4, 4) then find the co-ordinates of the foot of the perpendicular.
Concept: Equation of a Line in Space
The Cartesian equations of line are 3x -1 = 6y + 2 = 1 - z. Find the vector equation of line.
Concept: Equation of a Line in Space
The Cartesian equations of line are 3x+1=6y-2=1-z find its equation in vector form.
Concept: Equation of a Line in Space
The Cartestation equation of line is `(x-6)/2=(y+4)/7=(z-5)/3` find its vector equation.
Concept: Equation of a Line in Space
Find the coordinates of the point where the line through the points A(3, 4, 1) and B(5, 1, 6) crosses the XZ plane. Also find the angle which this line makes with the XZ plane.
Concept: Equation of a Line in Space
Find the value of p, so that the lines `l_1:(1-x)/3=(7y-14)/p=(z-3)/2 and l_2=(7-7x)/3p=(y-5)/1=(6-z)/5 ` are perpendicular to each other. Also find the equations of a line passing through a point (3, 2, – 4) and parallel to line l1.
Concept: Equation of a Line in Space
Find p and q if the equation px2 – 8xy + 3y2 + 14x + 2y + q = 0 represents a pair of prependicular lines.
Concept: General Second Degree Equation
Let `A(bara)` and `B(barb)` be any two points in the space and `R(barr)` be a point on the line segment AB dividing it internally in the ratio m : n, then prove that `bar r=(mbarb+nbara)/(m+n)`. Hence find the position vector of R which divides the line segment joining the points A(1, –2, 1) and B(1, 4, –2) internally in the ratio 2 : 1.
Concept: Equation of a Line in Space
Find the vector equation of the lines which passes through the point with position vector `4hati - hatj +2hatk` and is in the direction of `-2hati + hatj + hatk`
Concept: Equation of a Line in Space
The equation of a line is 2x -2 = 3y +1 = 6z -2 find the direction ratios and also find the vector equation of the line.
Concept: Equation of a Line in Space
