the talentless and shamless indian team became so called number one by beating teams even worse than them and England has done the same, beaten probbaly the worst test side i have ever seen in 40 years, this game is a joke.
Re: Why should we bother with this team
by Sameer Bhagwat on Aug 20, 2011 08:38 AM
I agree, the entire lot is shameless bunch of traitors including Srikanth and other selectors. The bubble has bursted, the indian ream has no talent, committment and self respect. Ban this filthy team that has no respect, i would like to see reaction if India was humiliated like this by Pakistan.
The Indian team must have thought it hardly matters whether it is 3-0 or 4-0, so why take bother to take the trouble to win at Oval. It seems they have have washed off their hands of this test already. Unless there is rain I don't see any change in the result in this test.
Re: Who is fed up Indian bowling?
by Ram Shyam on Aug 20, 2011 04:13 AM
Ohh yes!! Like it wasn't enough watching Harbhajan bowling crap over the last couple years, now have to put up with RP and Srresanth..
Re: Who is fed up Indian bowling?
by pravin sarode on Aug 20, 2011 08:39 AM
In technical drawing, an oval (from Latin ovum, 'egg') is a figure constructed from two pairs of arcs, with two different radii (see image on the right). The arcs are joined at a point, in which lines tangential to both joining arcs lie on the same line, thus making the joint smooth. Any point of an oval belongs to an arc with a constant radius (shorter or longer), whereas in an ellipse the radius is continuously changing.
Contents [hide] 1 Oval in geometry 2 Egg shape 3 Projective planes 4 In common English 5 See also 6 References
[edit] Oval in geometryIn geometry, an oval or ovoid is any curve resembling an egg or an ellipse, but not an ellipse. Unlike other curves, the term 'oval' is not well-defined and many distinct curves are commonly called ovals. These curves have in common that:
they are differentiable (smooth-looking), simple (not self-intersecting), convex, closed, plane curves; their shape does not depart much from that of an ellipse, and there is at least one axis of symmetry. The word ovoidal refers to the characteristic of being an ovoid. An ovoid is the surface generated by rotating an oval curve about one of its axes of symmetry.