force in public administration Being text of the 41st inaugural lecture of Lagos State University (LASU) delivered by Prof. Iyabo Olojede‚ professor of Public Administration on Tuesday‚ May 5‚ 2009 at the MBA Auditorium. INTRODUCTORY REMARKS THIS inaugural lecture is the second from the Faculty of Management Sciences and the first from the Public Administration Unit of the Department of Industrial Relations and Public Administration. My area of specialization is “Women and Public Administration”
Premium Public administration
is multiplied to pi (3.14) SA= Pi•r (r+l) *where Pi is multiplied to radius and multiplied to the sum of the measurements of the radius and slant height ~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ For Sphere SA=4•Pi•r^2 *where the SA is 4 times the product of Pi and the square of the radius of sphere
Free Area Volume Surface area
of Inertia is given by I = MR2 = 5 Kg × (0.03 m)2 = 0.0045 Kgm2. Question 2: A sphere is moving around in air. If the moment of inertia is 10 Kgm2 and radius of 1m‚ calculate its mass? Solution: Moment of inertia I = 10 Kgm2‚ Radius of sphere R = 1m‚ Moment of Inertia I = MR2 Mass of the body M = IR2 = 10Kgm21 = 10 Kg.
Premium Inertia Classical mechanics Mass
AREA (i) The area of a rhombus is equal to the area of a triangle whose base and the corresponding altitude are 24.8 cm and 16.5 cm respectively. If one of the diagonal of the rhombus is 22 cm‚ find the length of the other diagonal. (ii) The floor of a rectangular hall has a perimeter 250m. If the cost of paining the four walls at the rate of Rs 10 per m2 is Rs 1500. Find the height of the hall. (iii) A room is half as long again as it is broad. The cost of carpeting the room at Rs
Premium Volume Surface area
answer. 17. A quartz sphere is 14.5 cm in diameter. What will its change in volume if it is heated from 30Cº to 200Cº? I had the formula: V = VoT V = ? (Volumetric change in the sphere. We are solving for this.) = 1e -6 (Cº)-1 (Coefficient of volumetric expansion. It is on page 388 listed as .) Vo = (4/3) * (.145 m/2)3 (Initial volume. You must take the diameter and divide by to to get the radius. Then you must stick it in the formula for volume of a sphere: (4/3)r3 Vo =
Premium Thermodynamics Volume
Assignment – Formula Translation Total Marks: 100 Problem 1: In a town‚ the percentage of men is 52.The percentage of total literacy is 48.If total percentage of literate men is 35 of the total population‚ write a program to find the total number of illiterate men and women if the population of town is 80‚000. Problem 2: When Cheryl Harrison began her trip from Newyork to Wyoming; she filled her car’s tank with gas and reset its trip meter to zero. After traveling 324 miles‚ Cheryl
Premium Length Volume Mathematics
PUBLIC ADMINISTRATION MEANING ‚NATURE AND SCOPE Introduction Public Administration is a newly emerged discipline compare to other Social Science’s discipline. Public Administration has gained immense importance since the emergence of Administrative state. In Ancient Greek‚ Roman and Indian political system gave more importance to the concept of Administration. Kautilys’s “Arthasathra” contributed large scale in the administrative system; it deals every aspect of the state and its relation to subjects
Premium Public administration Management
advancement he made was to show that the area of a segment of a parabola is 4/3 the area of a triangle with the same base and vertex and 2/3 of the area of the circumscribed parallelogram. Archimedes also “invented” the volume and surface area of a sphere‚ the volume and area of a cone‚ the surface area of an ellipse‚ and the volume of any segment of a parabolic. No progress or advancements were made in calculus until the 17th century. One great mathematician that was born in Barsa‚ Persia is Abu Ali-Hasan
Premium Centuries Calculus Archimedes
problems. Under the guise of “liberating” East Asian countries from Western colonizers‚ Japan subjugated them and began laying down the foundation for its economic block‚ the Greater East Asian Co-Prosperity Sphere. Using the Draft of Basic Plan for Establishment of Greater East Asia Co-Prosperity Sphere‚ a secret paper made by a planning institute of the
Premium World War II World War II Japan
figure out the volume of the balloon by using the volume formula for the sphere shape which is representing the shape of the balloon; final volume of the submarine‚ where I divided its mass by its density to get its final volume so that I can create the perfect submarine for the experiment; final density of the submarine‚ where I added up all of the mass of balloon‚ pellets‚ and rubber band and divided by the volume of sphere so that I get the final density of my submarine and test if my submarine
Premium Volume Density Mathematics