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ارشاد ڈیروی اہلِ علم دی نظر وچ

ارشاد ڈیروی اہل علم دی نظر و چ
کسے لکھاری یاں شاعر دی مقبولیت دا اندازہ اوس دی شخصیت یاں لکھتاں بارے لکھیاں تحریراں توں لایا جا سکدا ہے کیوں جے ہر اہل قلم لکھاری یاں شاعر نال اپنے ذاتی تعلقات تے ادبی سانجھ پاروں اپنے وچاراں دا اظہار کردا اے ۔ بھانویں کہ ساڈے یاں ایہہ رواج پے گیا اے کہ لکھاری یاں شاعر دی حوصلہ افزائی کارن اوہدیاں لکھتاں بارے لکھیاں تحریراں اتے پیندی اے تاں وکھائی دیندا اے کہ ایہہ شخص بطور انسان تے شاعر بہوں خوش قسمتی دا مالک اے جو ہر بندہ ایہدے نال پیار کردا اے تے ایہدے سانگا جوڑن چاہندا اے ڈاکٹر سید مشتاق مہدی آپ کا تعارف آپ کا تعارف کرواتے ہیں :
’’ السلام علیکم کہہ کر اس نے ہاتھ بڑھایا ، کشادہ پیشانی ،روشن آنکھیں ،چوڑا سینہ ۔گٹھا ہوا بدن اور جفا کش کھردرے ہاتھ ، ہاتھوں کی صلابت سے اندازہ ہوا کہ تیشا زن فرہاد کے قبیلے کا فرد ہے جو حالات کے بھاری پتھر توڑ کر جوئے شیر لایا ہے ،یہ تعارف ہوا ،بعد ازاں یہ معلوم ہوا کہ پیشے کے اعتبار سے مزدور اور ذوق کے حوالے سے شاعر ہیں جو قلم کے ذریعے کج کلاہوں سے نبرد آزما رہتے ہیں ۔‘‘(۱)
ناصر جوادؔ ،ارشاد ڈیروی پاروں انج لکھدے نیں!
’’ اَحٖ دے جیرھے وی لکھاری ہِن او مرثیے دی ہیت کوں پورا نئیں کریندے ، چار پنج مسدس یا بند لکھ کے اونکوں مرثیے دا ناں ڈٖیندن چا، کربلائی ادب وچ او نوحہ تاں تھی سگٖدے پر او مرثیہ نئیں تھی سگٖدا ، مرثیے کوں پورے عزائم نال لکھنْاں پوندے ، اگر مرثیے دے اَٹھ اجزاوچوں ہک اجزا گھٹ ہے، تاں اونکوں مرثیہ نہ آکھسوں۔ اے سہرا سئیں ارشادؔڈیروی دے گٖل وچ ہے، جو اُنھیں مرثیہ کوں پورے عزائم تے فنی اعتبار نال...

صحتِ انسانی اور صحت مند ماحول میں نباتات کا کردار: سائنس اوراسلامی تعلیمات کے تناظر میں ایک مطالعہ

The research paper deals with role of plants in human health and healthy environment in the context of Qur'anic verses and science. The concept of growing plants for health rather than for food or fiber is slowly changing plant biotechnology and medicine. Rediscovery of the connection between plants and health is responsible for launching a new generation of botanical therapeutics that include plant-derived pharmaceuticals, multi component botanical drugs, dietary supplements, functional foods and plant-produced recombinant proteins. Many of these products will soon complement conventional pharmaceuticals in the treatment, prevention and diagnosis of diseases, while at the same time adding value to agriculture. Holy Quran describes the importance of rain as pure water to irrigate dead soil and emergence of life (plant’s growth) from the dead soil. Plants provide foods for human beings and are necessary for healthy environment. Man is an omnivore who gets his food from both plant and animal sources. However, for immediate energy, humans rely more on plant starches and soluble sugars, including glucose and edible sugar. Generally, our normal diet consists of rice or wheat bread which is a very important source of starch.  Sugar and fats are the two most important components of food managed by plants. Apart from this, the man manages vegetables and salads from plants which are the guarantors of his health/survival in modern times. There are many reasons for diversity in plants. The obvious reason is the chemistry of that particular piece of land, what kind of minerals/salts and other nutrients that land has and what types of plants can grow there in their presence. In this research written with a descriptive and analytical approach, it is proved that according to Quran and science plants have a great role in human health and healthy environment.

On the Averages of Convex Functions

“Behind every theorem lies an inequality”. Mathematical inequalities play an impor- tant role in almost all branches of mathematics as well as in other areas of science. The basic work ”Inequalities” by Hardy, Littlewood and Polya appeared 1934 [37]and the books ”Inequalities” by Beckenbach and Bellman published in 1961 [9] and ”An- alytic inequalities” by Mitronovic published in 1970 made considerable contribution to this field and supplied motivation, ideas, techniques and applications. This theory in recent years has attached the attention of large number of researchers, stimulated new research directions and influenced various aspect of mathematical analysis and applications. Since 1934 an enormous amount of effort has been devoted to the dis- covery of new types of inequalities and the application of inequalities in many part of analysis. The usefulness of Mathematical inequalities is felt from the very be- ginning and is now widely acknowledged as one of the major deriving forces behind the development of modern real analysis. This dissertation deals with the inequali- ties for Jensen inqualites involving average of convex functions, Hermite-Hadamard inequalities. Chapter 1 offers an overview of the basic results contains a survey of basic concepts, indications and results from theory of convex functions and theory of inequalities used in subsequent chapters to which we refer as the known facts. Chapter 2 we give proofs of convexity and Schur convexity of the generalized inte- gral and weighted integral quasi-arithmetic mean. An overview of assorted proofs of schur convexity of integral arithmetic mean is discussed. In a detailed proof, discrete Jensen inequality for integral arithmetic mean is derived. Also integral version of Jensen inequality for integral arithmetic mean is proved. Motivated by discrete and viiviii integral Jensen inequalities functionals are defined. Two different method is given for constructing new examples of exponentially convex functions from non trivial gen- erating families of functions. Mean value theorem are proved. Different classes of monotonically increasing Cauchy means are created. Chapter 3 gives us convexity and Schur convexity of functions connected to Hermite- Hadamrd inequality as well as Schur convexity of differences of Hermite-Hadamrd inequality and Hammar-Bullen inequality by different proofs. Applying assorted gen- eralizations of Hermite-Hadamard inequality and Hammer-Bullen inequality on some special families of functions from varied classes, n-exponentially convex functions are generated by quite new method. Lyponuve, Dresher and Gramm’s type inequalities are developed. Pretty different Stolarsky type means are derives preserving inherited monotonically increasing property. Chapter 4 deals with inequalities of higher order convexity and divided difference. Two of them use majorization results and others are related to Jensen inequalities and Hermite-Hadamrd inequality. Integral Jensen inequality for divided difference is proved. Applications of averages of 3-convex functions as first order divided difference of convex functions are acquired. Method of producing n-exponentially convex func- tions is applied using divided differences. Produced functions are used in studying Stolarsky type means In the fifth chapter results about averages values of convex func- tions with variable limits and average values of composition functions is given. Study functionals for inequalities proved by D.E. Wulbert ( call them Wulbert’s inequalities for convenience) for convex and three convex functions. Extensions, improvements are accomplished. Variety of Stolarsky type means of a concave (convex) functions are obtained.
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