Teenage pregnancy in ireland Thesis Example | Topics and Well Written Essays - 4000 words

Teenage pregnancy in ireland - Thesis Example The teenage pregnancy is a contentious issue in Ireland, and the problem is especially pronounced in County Louth which is one of smallest counties in Ireland with the highest rate of teenage pregnancies (Crisis Pregnancy Agency, 2007). Many society members view most cases of teenage pregnancy as a burden and a barrier to the achievement of the necessary education status and employment standards. However, there is also a growing acceptance of non-standard family models. This research will aim to explore the attitudes of the society toward teenage pregnancy. The literature review will comprehensively discuss the problem of teenage pregnancy, teenage birth rates in Ireland, risk factors and health risks of teenage pregnancies to provide the theoretical aspects of the research on teenage pregnancy as well as the society attitudes toward young mothers. According to Keller (2002), the rate of teenage pregnancies in both County Louth and Dublin is the same i.e. 6.8pc. However, the statisti cs from the 2002 research could be currently different due to the fact that the difference in the sizes of the two cities leads to a difference in the social norms. Being larger than County Lough, the teenage birth rates could be higher in Dublin because the sexual activities will be more rampant, the catholic culture will have less impact, and the multicultural impact is high. The 2010 statistics from the Central Statistics Office (CSO) indicates that teenage pregnancy in Ireland has been reduced in significant levels and it led to birth of 2, 043 babies for the mothers under the age of 20 (CSO, 2010). This was a decline from the 2006 statistics, when 2352 cases represented 0.4% of the total births among women that year (Crisis Pregnancy Agency, 2007). Majority of the teenage births are noted among girl between eighteen to nineteen years old. For example,

Comparing unacademic genre Essay Example | Topics and Well Written Essays - 750 words

Comparing unacademic genre - Essay Example This film indeed plays like real life events happening in a modern television network station. The main actor appears to reason with critics, something that gives him an edge to pass on his message that current journalists have more ways of speaking the truth to those in authority fearlessly. He goes on showing that, the modern journalist has been able to attract the attention even first-time viewers and consequently being able to engage the viewer to give an opinion concerning both public and private policies. The movie has portrayed news anchors and journalists as people who do feed viewers and readers with the right content but in between tilt it to favor their side of the argument. That way they have an upper hand of influencing public opinion about how the ruling class executes its policies. The film is quite interesting and captivating, with all characters coming out boldly and playing their roles interactively. The piece signifies the importance of working out in a calculative and composed way with the bigger picture in mind. From the movie, one can learn how to single out truth from fiction in the work of journalists and figure out how to make independent decisions instead of following their lead. As shown, that best way is to digest the question the journalist asks then give a reply based on that piece of the article without an analysis. The piece with analysis is meant to divert your vision to something similar to what the article talks of. The movie is about a female messiah-like figure (Jupiter) who is engaging King Lear family villain siblings in a bitter war to control the solar system. The villains play tough prompting Jupiter to seek assistance from baddies, who are members of another dynasty. The baddies immediately become interested in her and compel her to sign a property deed that shall allow them to harvest her eggs. These eggs contain energy of imprisoned people, so the buddies want to

Overview of Famous Mathematicians

Overview of Famous Mathematicians Mathematicians’ Manifesto A young man who died at the age of 32 in a foreign land he had travelled to, to pursue his craft. A clumsy eccentric who could visualize his complete work in his head before he put it to canvas. A Russian who shuns the limelight and refuses recognition for his work. A traveller who went from country to country on a whim in order to collaborate with others. A man whose scribblings inspired the life work of hundreds. A woman, who escaped the prejudices against her gender to make a name for herself. A recluse who spent close to ten years working on one piece. A revolutionary child prodigy who died in a gun duel before his twenty-first birthday. What do you picture when you read the above? Artists? Musicians? Writers? Surely not mathematicians? Srinivas Ramanujan (1887-1920) was a self-taught nobody who, in his short life-span, discovered nearly 3900 results, many of which were completely unexpected, and influenced and made entire careers for future mathematicians. In fact there is an entire journal devoted to areas of study inspired by Ramanujan’s work. Even trying to give an overview of his life’s work would require an entire book. Henri Poincare (1854-1912) was short-sighted and hence had to learn how to visualise all the lectures he sat through. In doing so, he developed the skill to visualise entire proofs before writing them down. Poincare is considered one of the founders of the field of Topology, a field concerned with what remains when objects are transformed. An oft-told joke about Topologists is that they can’t tell their donut from their coffee cup. A conjecture of Poincare’s, regarding the equivalent of a sphere in 4-dimensional space, was unsolved till this century when Grigori Perelman (1966- ) became the first mathematician to crack a millenium prize problem, with prize money of $1million. Perelman turned it down. He is also the only mathematician to have turned down the Fields Medal, mathematics’ equivalent of the Nobel Prize. Have you heard of the Kevin Bacon number? Well mathematicians give themselves an Erdos number after Paul Erdos (1913-96) who, like Kevin Bacon, collaborated with everybody important in the field in various parts of the world. If he heard you were doing some interesting research, he would pack his bags and turn up at your doorstep. Pierre de Fermat (1601-65) was a lawyer and ‘amateur’ mathematician, whose work in Number Theory has provided some of the greatest tools mathematicians have today, and are integral to very modern areas such as cryptography. He made an enigmatic comment in a margin of his copy of Diaphantus’ ‘Arithmetica’ saying: ‘It is impossible to separate a cube into two cubes, or a fourth power into two fourth powers, or in general, any power higher than the second, into two like powers. I have discovered a truly marvellous proof of this, which this margin is too narrow to contain.’ Whether he actually had a proof is debatable, but this one comment inspired work for the next 300 years. In these intervening 300 years, one name has to be mentioned Sophie Germain (1776-1831). Germain remains one of the few women who have broken the glass ceiling and made significant contributions to mathematics. She was responsible for proving Fermat’s scribblings for a large amount of numbers. I apologise to Andrew Wiles (1953- ) for calling him a recluse, but he did spend close to 10 years on the proof of Fermat’s Last Theorem, during most of which he did not reveal his progress to anybody. Saving the best for last, Evariste Galois (1811-32), a radical republican in pre-revolutionary France, died in a duel over a woman at the age of 20. Only the night before, he had finished a manuscript with some of the most innovative and impactful results in mathematics. There is speculation that the resulting lack of sleep caused him to lose the duel. Galois developed what became a whole branch of mathematics to itself Galois Theory, a sub-discipline which connect two other subdisciplines of abstract algebra. It is the only branch of mathematics I can think of which is named after its creator (apart from Mr. Algebra and Ms. Probability). This might appear to be anecdotal evidence of the creative spirit of mathematics and mathematicians. However, the same can be said about the evidence given for Artistic genius. In fact there is research which shows that the archetype of a mad artistic genius doesn’t stand on firm ground. So, lets move away from exploring creative mathematicians, to the creativity of the discipline. Mathematics is a highly creative discipline, by any useful sense of the word ‘creative.’ The study of mathematics involves speculation, risk in the sense of the willingness to follow one’s chain of thought to wherever it leads, innovative arguments, exhilaration at achieving a result and many a time beauty in the result. Unlike scientists, mathematicians do not have our universe as a crutch. Elementary mathematics might be able to get inspiration from the universe, but quickly things change. Mathematicians have to invent conjectures from their imagination. Therefore, these conjectures are very tenuous. Most of them will fail to bear any fruit, but if mathematicians are unwilling to take that risk, they will lose any hope of discovery. Once mathematicians are convinced of the certainty of an argument, they have to present a rigorous proof, which nobody can poke any holes in. Once again, they are not as luck as scientists, who are happy with a statistically signific ant result or at most a result within five standard deviations. As a result of this, once you prove a mathematical theorem, your name will be associated with it for eternity. Aristotle might have been superseded by Newton and Newton by Einstein, but Euclid’s proof of infinite primes will always be true. As Hardy said, â€Å"A mathematician, like a painter or poet, is a maker of patterns. If his patterns are more permanent than theirs, it is because they are made with ideas.† The beauty of mathematical results and proofs is a fraught terrain, but there are certain results, great masters such as Euler’s identity and Euclid’s proof, which are almost universally accepted as aesthetically pleasing. So, why are people so afraid of mathematics? Why do they consider it to be boring and staid? Well, the easy answer is that they are taught shopkeeper mathematics. In school, you are taught to follow rules in order to arrive at an answer. In the better schools, you are encouraged to do so using blocks and toys. However, basically the only skills you are getting are those which help you in commercial transactions. At the most, you get the skills to help you in other disciplines like Economics and the Sciences. There has been a huge push in the recent past for the Arts to be taught in school ‘for art’s sake.’ There would be uproar tomorrow amongst artists and the liberal elite if art class turned into replicating posters (not even creating them). There would even be a furore if the only art students did was to draw the solar system for Science class and the Taj Mahal for Social Studies. What good art classes involve is teachers introducing concepts such as particular shapes and then encouraging students to experiment and create based on those concepts. What about ‘maths for maths’ sake?’ Students should be encouraged to come up with their own conjectures based on concepts introduced by the teacher. This class would have to be closely guided by a teacher who is conceptually very strong, so that they can give examples in order to get students to come up with conjectures. They would also be required to provide students with counterexamples to any conjecture they have come up with. I am not suggesting completely doing away with the current model of mathematics education involving repeated practice of questions. Just as replication probably helps in the arts and the arts can serve as great starting points for concepts in other disciplines, repetition is important in mathematics as it helps you intuit concepts and certain mathematical concepts are important for the conceptual understanding of other disciplines and for life. So, there needs to be a blend of mathematics classes (those which teach mathematics) and shopkeeper classes (those which teach mathematical concepts for other disciplines and for life). These would not work as separate entities and might even be taught at the same time. This requires a complete overhaul of the mathematics curriculum with a much lighter load of topics so that teachers can explore concepts in depth with their students. It also requires a larger emphasis on concepts such as symmetry, graph theory and pixel geometry which are easi er to inquire into and form conjectures in than topics like calculus. Now we come to the logistics. How many teachers are there in the country who have a strong enough conceptual understanding required to engage with mathematics in this manner? I would be pleasantly surprised if that were a long list, but I suspect it isn’t. In order to build up this capability, the emphasis at teacher colleges and in teacher professional development has to move from dull and pointless concepts like classroom management and teaching strategies, to developing conceptual understanding, at least in Mathematics. The amount of knowledge required to teach school mathematics is not all that much. All that is required is a strong conceptual base in a few concepts along with an understanding of mathematics as an endeavor, and a disposition for the eccentricities of the discipline. Even so, this will not be easy to accomplish and will take time. In the meanwhile, wherever possible, professional mathematicians could come in to schools and work with teachers on their lesson plans. In other cases, these mathematicians could partner with educationalists and come up with material, which can more or less be put to use in any class (this is not ideal as lesson plans should be created by the teachers and evolved based on their understanding of their class, but this will have to do in the interim). Not only will this help in developing a disposition for mathematics and hopefully churn out mathematicians, but it will also help in the understanding of shopkeeper mathematics. Pedagogy and conceptual understanding are not separate entities. In fact a strong conceptual understanding is a prerequisite for effective pedagogy. Mathematics is unfortunate in its usefulness to other disciplines and the utility it provides for life. In the meanwhile, the real creative essence of the discipline is lost. I don’t blame students for hating mathematics in school. In fact it is completely justified. Mathematics is missing out. Who knows, one of these students would have proved the Riemann Hypothesis in an alternate reality. Artists have been very successful in campaigning for the creativity of their discipline to be an integral part of schools. Mathematicians, on the other hand, really need to pull up their socks and join the fight for the future of mathematics. In the spirit of Galois, Mathematicians of the World Unite! You have nothing to lose but the chains of countless students!

Historia del Flamenco - Spanish Essay :: Papers Espagnol Essays

Historia del Flamenco - Spanish Essay La mà ºsica flamenca empezà ³ con una voz y unas palmas, y mà ¡s tarde se incorporà ³ la guitarra. Es sà ³lo en este siglo cuando se introdujo el zapateo. Hoy en dà ­a, las tres principales herramientas del flamenco son el cante, la guitarra y el baile. Casi todos los estilos o palos flamencos pueden interpretarse con o sin baile, habiendo bailes sin cante y temas puramente vocales, "a cappela". Hoy, el flamenco tiene muchas caras y es ejecutado de mà ºltiples maneras. En el flamenco moderno es comà ºn el uso de algunos instrumentos mà ¡s, como el bajo elà ©ctrico, normalmente sin trastes (tal como comenzà ³ a usarlo Carlos Benavent) y el cajà ³n. El cajà ³n es un instrumento de percusià ³n peruano que, con ligeras modificaciones, introdujo Paco de Lucà ­a y su grupo, y consiste en una caja de madera con un panel frontal suelto que se toca sentado sobre ella y que se adapta muy bien al flamenco porque no tiene una afinacià ³n determinada y proporciona un sonido sin armà ³nicos muy seco. El nuevo flamenco, etiqueta con la que se agrupan las formaciones jà ³venes menos preocupadas por el purismo y mà ¡s interesadas en la mezcla de mà ºsicas, incorpora saxos, flautas, violonchelos, violines o el sitar, e innumerables instrumentos de percusià ³n como los bongos, las congas de sudamà ©rica, la darbuka y el djembe indios, etc. El uso de baterà ­as, sintetizadores y guitarras elà ©ctricas es menos habitual. El flamenco es una de las mà ºsicas mà ¡s peculiares y reconocible de Europa. Las raà ­ces del flamenco se formaron recogiendo influencias de muy diversos orà ­genes: podemos encontrar en esta mà ºsica aportaciones hindà ºes, à ¡rabes, judà ­as, griegas, castellanas, etc. Cà ³mo llegaron a fundirse en el flamenco las aportaciones de tantas culturas es una larga e interesante historia llena de leyendas y malinterpretaciones. Los Gitanos del sur de Espaà ±a crearon esta mà ºsica dà ­a a dà ­a desde su

Red Scare Created McCarthyism

Fear. Fear is an unpleasant emotion caused by the belief that someone or something is dangerous, likely to cause pain, or a threat. Fear is a chain reaction in the brain that causes stressful stimulus, causing the release of chemicals. This is what makes your heart race, fast heavy breathing, and energized or tense muscles. Fear can be the chain reaction through your own body and through your peers. In the 1950’s, after World War Two, there was the nationwide fear called the Red Scare. The ‘Red Scare’ is a period of time where there was strong anti ­communism in the United States. Senator Joseph McCarthy became the public face of that movement. His intentions fueled fear of Communist subversion to the nation. The â€Å"Red Scare† caused America to be in fear of communism, motivating Senator Joseph McCarthy to take advantage of his power. Harry S. Truman was the president during McCarthyism. On March 21, 1947 Truman signed United States Executive Order 9835, sometimes known as the â€Å"Loyalty Order† . This order was developed to establish loyalty for the United States, and root out communist sentiment in the federal government. Truman aimed the opinion of communism on the public. Executive Order 9835 also was the main motivation for the creation of the Attorney General's List of Subversive Organizations. This became known as McCarthyism. The Loyalty Order was part of the introduction to the rise of Joseph McCarthy.

Confidentiality Notes

Ethical theories and principles that are related to confidentiality are- confidentiality is one of the most basic principles in health care practice and it is the most long-standing ethical dictum in health care codes of ethics. It is the practice of keeping harmful, shameful, or embarrassing patient information within proper bounds. The right to privacy gives legal standing to this ethical principle. ). a reliable test for who among team members should be given certain types of information is need to know basis.It is necessary for one to adequately perform ones specific job responsibilities- meaning that by giving the information does it provide the adequate caring response that is required for the patient) Immediate aims of confidentiality are to: 1. Facilitate the sharing of sensitive information with the goal of helping the patient 2. Exclude unauthorized people from such information 3. Discern need to know information from mere interest when deciding what to share.Confidentialit y serves as one cornerstone for the solid foundation of a trusting health professional-patient relationship that should be built AMA principles of medical ethics states that:- a physician shall respect the rights of patients, of colleagues and of other health professionals and shall safeguard patient confidences within the constrains of the law. This provides a conflict when a physician knows that some secret may be harmful for the patient and yet are bound to keep it.Breaking Confidence- Legal exceptions to the standard of practice that confidences must be kept, except with the patient’s consent or at the patient’s request to break it include * An emergency in which keeping the confidence will harm the patient * Patient is incompetent or incapacitated and a third party needs to be informed for decision making for the patient * Third parties are at a risk for harm (eg. Sexually transmitted diseases, child or other abuses) * Request for commitment or hospitalization of a psychiatrically ill patient * A serious risk that any others may be harmed (a terrorist threat) Eventually breaking of confidence always enlists at least one harm and for health professionals it is to minimize the harm 6 step process in confidentiality situations 1. Step 1- Gather relevant information- 2. Step 2 &3- identify the type of ethical problem and the ethics approach to analyze it 3. Step 4- Explore the practical alternatives 4. Step5- Complete the action 5. Step 6- Evaluate the process and outcomeEthical principles or elements that support confidentiality are * Beneficence * Nonmaleficence or fidelity * Right to autonomy Key character trait is trustworthiness kindness, compassion, and courage to help with the challenging situations. Patient care information systems (PCIS)- is a computerized systems of record of patients that are permanently kept in an electronic form Health information managers- (also known as the gatekeepers of medical records) are key members of the he alth care team.Their primary role is the responsibility for designing and maintaining the system that facilitates the collection, use and dissemination of health and medical information. They ensure that the medical records are correct and kept in privacy and are only given to the health professionals that have the right to see them. They ensure that the records are not abused or released to unauthorized persons. Medical record is an extremely useful document for the health professionals * Can be found both in paper and electronic form They are systematic accounts of a patient’s encounter with a health provider * They serve as a repository of information * Generated by and contributed to by many providers in various health delivery settings * EHR- Electronic health record is an electronic record of patient health information, they often include patient demographics, progress notes, problems, medications, relevant social history, medical history, vital signs, laboratory data a nd diagnostic reports guidelines that are applicable when recording patient information 1. Questionable information should be clearly labeled as questionable 2. True information that is not relevant to should not be recorded 3. All information should be handled among health professionals with regard for the privacy and dignity of patients Confidentiality finally comes down to each professional being vigilant about the flow of patient information, guided by the goal of using information to help the patient.Patient privacy- Health Insurance Portability and Accountability Act (HIPAA) of 1996 * This act imposed considerable new constraints on the use and disclosure of a patient’s personal clinical information * Major goal of HIPAA is to ensure that an individual’s health information is properly protected while allowing the glow of information needed to promote high-quality care * This set of regulations are called the New Federal Medical Privacy Rule- basic intent is to co ntrol the use or disclosure of â€Å"protected health information† * One area that this rule strongly affects is the handling of information for purposes of research.It has also been interpreted to mean that information about patients (including family members) cannot be released * A â€Å"covered entity† is defined as a health plan, data processing company, health care professional, or hospital The Health Information Technology for Economic and Clinical Health Act- * Parts of this act expanded and strengthened the privacy laws that protect patient health information originally outlined under HIPAA. Provides additional provisions regarding privacy and security breaches, reporting of breaches, accounting of disclosures, restrictions of disclosures for sales and marketing purposes, and monetary penalties associates with HIPAA violations.