Download OU B.Pharma 1st Year 2014 8035 Mathematics Question Paper

Download OU (Osmania University) B.Pharma 1st Year (Bachelor of Pharmacy) 2014 8035 Mathematics Previous Question Paper

This post was last modified on 03 May 2020

Download Document

OU B.Pharm Question Papers Last 10 Years 2010-2020 || Osmania University

b) If x=1+log_abc, y=1+log_bca and z=1+log_cab. Prove that Xyz = Xy + yz + zX.

In a triangle ABC, prove that Sin²A + Sin²B — Sin²C = 4 cos A cos B sin C.

--- Content provided by FirstRanker.com ---

If tan a = ⁵/₈ and tan ß = ¹/₃ then show that tan(2a + ß)=1.

If a^x=b^y=c^z and y²=zx. Prove that log_b a = log_c b.

Find the derivative of cotx using first principle.

Show that the function is not differentiable at 2 where f(x)= |x-2| / x²

--- Content provided by⁠ FirstRanker.com ---

Find the maximum and minimum values of the polynomial f (x)=x³-6x² + 9x + 15.

If u=log (x²+y²)^1/2 prove that x ?u/?x + y ?u/?y = 1

Evaluate ? ¹/_3+5x-2x² dx

Evaluate ?(xv(1 +e^x))dx

--- Content provided by FirstRanker.com ---

Evaluate ? ¹/_4+5cosx dx

Show that $| \begin{array}{lll} bc & b+c & 1 \\ ca & c+a & 1 \\ ab & a+b & 1 \end{array} | = (a - b) (b - c) (c - a)$

Solve the equations 3x + 4y + 5z = 18, 2x —y + 8z = 13 and 5x - 2y +7z = 20 by matrix inversion method.

--- Content provided by FirstRanker.com ---

Find the rank of the matrix A= $[\begin{array}{ccc} 1 & -4 & 5 \\ 2 & 1 & 3 \end{array}]$

5 a) i) Find the equation of the circle passing through the points (1, 2), (3, -4) and (5, -6).

ii) Find the equation of the line having intercepts a and b on the axes such that a + b=5 and ab=6.

--- Content provided by‌ FirstRanker.com ---

b) i) Find the equation of the line passing through the point (2, -3) and having intercepts whose ratio is 3 : 2.

iy Find the centre and radius of the circle 3x² + 3y² +6x—12y—1=0.

--- Content provided by FirstRanker.com ---

This post was last modified on 03 May 2020