tag:blogger.com,1999:blog-82451323127756612332024-03-05T13:42:24.584-08:00Adieu mes poignées d'amour!Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.comBlogger6125tag:blogger.com,1999:blog-8245132312775661233.post-85464535621939374182011-10-13T09:32:00.000-07:002011-10-13T09:32:53.206-07:00Les sodas rendent-il obèses?<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Il m'arrive de « consommer »
les journaux gratuits lors de mes trajets en métro. Ce matin, j'ai
pu ainsi découvrir <a href="http://www.metrofrance.com/info/taxes-alourdies-pour-les-sodas-et-la-malbouffe/mkjl%211lrjuiry63LYI/">un article intéressant de Métro</a> (justement) au
sujet de la fameuse taxe sur les sodas dont nous entendons parler
depuis quelques temps.</div>
<div>
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Pour résumer, le gouvernement veut
mettre en place une taxe sur les boissons sucrées dans le cadre du
plan gouvernemental de réduction des déficits publics dont l’un
des objectifs est de plafonner à 2,8% l’augmentation des dépenses
de santé en 2012. Pour le gouvernement, les boissons sucrées ont
des impacts sur l'augmentation de l'obésité, au même titre que le
tabac et l'alcool, et de fait entrainent des dépenses de santé
importantes qu'il est normal de compenser par cette taxe.</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Cette justification sanitaire permet à
Métro de débuter son article en rappelant les chiffres alarmant sur
l'obésité au niveau mondial publiés dans un rapport de la Croix
Rouge (ces chiffres reprennent les statistiques développées par
l'OMS) :</div>
<blockquote>
<div style="margin-bottom: 0cm; text-align: justify;">
<i> "Selon la Croix-Rouge, en 2010, 1,5
milliard de personnes souffraient d’obésité, alors que 925
millions étaient touchées par la malnutrition. <b>“Les excès
alimentaires tuent aujourd’hui plus que la faim”</b>, a souligné
Jagan Chapagain, le directeur Asie-Pacifique de la Croix-Rouge. Et
les gouvernements commencent à prendre la mesure du problème."
</i></div>
</blockquote>
<div style="text-align: justify;">
</div>
<div style="text-align: justify;">
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<b>Les excès alimentaires tuent
aujourd'hui plus que la faim</b>...ça laisse à méditer...</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
</div>
<a name='more'></a> Pour en revenir à notre taxe soda, il
a d'abord été question de la doubler et aujourd'hui de l'étendre
aux produits qualifiés de « light ». Cette mesure et ces
rebondissements agacent bien sûr les industriels qui produisent ces
boissons. Pour eux, leurs produits sont instrumentalisés d'autant
plus que des études montreraient l'absence de lien entre
consommation de soda et obésité. L'article nous rappelle d'ailleurs
que :<br />
<blockquote>
<div style="margin-bottom: 0cm; text-align: justify;">
<i>" certains, comme le Pr Patrick Tounian,
de l’Inserm, estiment qu’ “il n’y a aucun lien entre la
consommation de boissons sucrées et l’obésité. Si demain on les
interdisait, il n’y aurait pas un seul enfant obèse en moins”."</i></div>
</blockquote>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Sans débattre ici de l'utilité d'une
telle taxe et de son efficacité, nous pouvons nous pencher sur le
problème des sodas et leurs impacts possibles sur nos cellules
graisseuses.</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
L'étiquette d'une célèbre boisson au
cola nous indique que <b>pour 25 cl (soit un verre) nous ingérons 27
g de sucre et que cela représente près de 30% de nos besoins
journaliers en sucre</b>. En d'autres termes 3,5 verres de cette boisson
couvrent les apports recommandés en sucres. En comparaison l'eau ne
contient quasiment pas de sucre (Certaines eaux minérales peuvent en
présenter autour de 1g pour 25 cl mais guère plus).</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
De fait pour une consommation de soda
qui vient remplacer l'eau, comme on peut parfois le constater, <b>il
n'est pas difficile de dépasser largement les apports journaliers
recommandés en sucre, d'autant plus que le reste de notre
alimentation en contient également.</b></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Le problème du sucre est qu'il va
provoquer dans notre corps une montée de l'insuline hormone qui va
donner le signal de remplir nos cellules graisseuses. <b>Mêlé à notre
alimentation il va donc agir comme un facilitateur du stockage de
graisse.
</b></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br />
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Il est fort probable que les gens en
surpoids ne le sont pas à cause des sodas, mais à cause d'un
ensemble de mauvaises habitudes alimentaires qu'il faut apprendre à
modifier. Ainsi quelqu'un qui aura une alimentation équilibrée et une
bonne hygiène de vie ne deviendra pas soudainement plus gros s'il
consomme des sodas de manière raisonnée. <b>Néanmoins si vous
cherchez à perdre du poids et donc a donner à votre corps le signal
de consommer ses réserves, les sodas ne seront probablement pas vos
meilleurs amis !</b></div>Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0tag:blogger.com,1999:blog-8245132312775661233.post-39532730947488487842011-10-12T09:30:00.000-07:002011-10-12T09:32:26.924-07:00Comment maigrir? une simple équation!<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Pour survivre notre corps a besoin
d'énergie. Ceci n'est pas seulement vrai lorsque nous faisons du
sport ou tout autre activité physique, c'est aussi le cas lorsque
nous nous reposons et même en plein sommeil. Sans que nous en soyons
forcement conscient, notre corps est en constante activité. Cela lui
permet de faire circuler le sang dans nos veines, d'actionner nos
poumons, de régénérer ses cellules ou encore de faire fonctionner
les neurones de notre cerveaux lorsque nous réfléchissons. Notre
cerveau est d'ailleurs un des gros consommateurs d'énergie de notre
organisme. Il a besoin de 6 grammes de glucose par heure, le glucose
étant l'un des carburant essentiel de notre organisme. L'ensemble de
ces fonctions de notre organisme qui se poursuivent même au repos
pour assurer notre survie est appelé le métabolisme de base. Nous
avons donc en permanence besoin d'énergie pour assurer ce
métabolisme de base, voire plus si nous pratiquons une activité
physique plus ou moins intense.
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br /></div>
<div>
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<b>D'où provient cette énergie ?</b>
Tout d'abord de la nourriture que nous ingérons mais pas seulement.
Dans des temps reculés, quand nos ancêtres devaient chasser leur
nourriture et ne disposaient pas du stock des supermarchés durant
l'hiver, avoir la capacité de stocker des réserves d'énergies
quant la nourriture était abondante pour les utiliser en temps de
famine était un processus nécessaire à la survie.</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Face à un surplus d'énergie, le corps
de nos ancêtres avait donc acquis la capacité d'organiser un
stockage des nutriments dans des cellules spécifiques : les
cellules graisseuses. Ces cellules sont tels des petits sacs qui se
remplissent quand les apports sont abondants et restituent peu à peu
leur contenu quand la nourriture vient à manquer permettant ainsi à
l'organisme de survivre.</div>
<div style="text-align: justify;">
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
</div>
<a name='more'></a>Seulement, ce système de survie
persiste aujourd'hui dans un monde où, pour les sociétés
industrialisées du moins, les individus ont la chance de ne plus
avoir à souffrir de manque de nourriture. A l'inverse nous
consommons une nourriture plus abondante, plus riche et de manière
bien plus régulière que ce que la chasse et la cueillette
permettaient à nos ancêtres. Face à cette abondance d'énergie
notre corps à garder le réflexe d'assurer le stockage des calories
supplémentaires en prévision d'une famine qui ne viendra pourtant
jamais. Du coup notre organisme multiplie le nombre et la taille des
cellules graisseuses, engendrant les surpoids de plus en plus
fréquent dans nos sociétés modernes.
<br />
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br /></div>
<div style="text-align: justify;">
</div>
<div style="color: black; margin-bottom: 0cm; text-align: justify;">
<b>L'important et donc de trouver le moyen
de redonner à notre organisme le bon signal. Ce signal qui lui
indiquera qu'il est temps d'arrêter de faire des réserves et au
contraire de commencer à utiliser le stock d’énergie emmagasiné
dans nos cellules graisseuses.</b></div>
<div style="color: black; text-align: justify;">
</div>
<div style="color: black; margin-bottom: 0cm; text-align: justify;">
Le principe est simple, pour cela notre
corps a besoin d'un déficit d'énergie. L'équation se résume
ainsi :</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br /></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: center;">
<b>Calories ingérées < Calories
utilisées</b></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br /></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Pour rétablir cette balance il est
donc nécessaire soit de consommer moins d'énergie, soit d'en
utiliser plus. En d'autre termes nous pouvons agir de deux façons :</div>
<div style="text-align: justify;">
</div>
<ul>
<li><b>réduire les calories ingérées via
notre nourriture</b></li>
</ul>
<div style="text-align: justify;">
</div>
<ul style="text-align: justify;">
<li><div style="margin-bottom: 0cm;">
<b>augmenter notre activité physique</b></div>
</li>
</ul>
<div style="text-align: justify;">
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Le meilleur moyen d'y arriver est
d'agir sur notre nourriture. En effet, peu importe tout le sport que
l'on pourra faire, si l'on mange trop sans faire attention à la
qualité de nos aliments, nous ne pourrons que très difficilement
compenser le nombre de calories ingérées par l'activité sportive.
</div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
<br /></div>
<div style="text-align: justify;">
</div>
<div style="margin-bottom: 0cm; text-align: justify;">
Mais comme nous l'avons vu dans <a href="http://adieupoigneesdamour.blogspot.com/2011/10/les-regimes-amaigrissant-dukan-atkins.html">les recommandations de l'ANSES</a>, l'activité sportive est un facteur
important pour le maintien d'une perte de point. Nous verrons
pourquoi et que faire dans de prochains billets !</div>Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0tag:blogger.com,1999:blog-8245132312775661233.post-70913326520234942972011-10-10T11:31:00.000-07:002011-10-10T11:33:40.053-07:00Les régimes amaigrissant Dukan, Atkins et cie pourraient avoir des conséquences néfastes sur la santé selon l'ANSES.<br />
Le 4 mai 2011, <a href="http://www.anses.fr/">l'agencenationale de sécurité sanitaire de l'alimentation del'environnement et du travail (ANSES)</a> a rendu un avis relatif à la
demande d'évaluation des risques liés aux pratiques alimentaires
d'amaigrissement suite à une saisine du Ministère de la Santé.
<br />
<div style="margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
L'ANSES a identifié 15
régimes amaigrissant parmi les plus populaires ( régimes Montignac,
Atkins, Dukan,...) pour évaluer leurs caractéristiques
nutritionnelles, en particulier leurs apports en protéines, glucides
et lipides et les éventuelles conséquences qu'ils peuvent avoir sur
ceux qui les pratiquent.</div>
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
Ainsi, l'ANSES a pu identifier que dans
la majorité des cas :</div>
<ul>
<li><div align="JUSTIFY" style="margin-bottom: 0cm;">
l'apport en
protéines est supérieur à l'apport nutritionnel conseillé,</div>
</li>
<li><div align="JUSTIFY" style="margin-bottom: 0cm;">
le besoin
nutritionnel moyen en calcium n'est pas couvert pour 23% des phases
de régime,</div>
</li>
<li><div align="JUSTIFY" style="margin-bottom: 0cm;">
pour plus de la
moitié des phases de régime les apports en sodium sont supérieurs
à la limite recommandée par l'Organisation mondiale de la santé.</div>
</li>
<li><div align="JUSTIFY" style="margin-bottom: 0cm;">
3 phases de régimes
sur 4 conduisent a des apports en fibres inférieurs à l'apport
nutritionnel conseillé.</div>
</li>
</ul>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
L'ANSES précise que
l'analyse bibliographique souligne le risque d'apparition de
conséquences néfastes pour la santé associées à la pratique de
ces régimes. L'ANSES souligne également que <b>l'amaigrissement des
personnes soumises à ces régimes ne concerne pas seulement leurs
réserves de graisses mais également leur masse maigre</b>,
notamment musculaire et osseuse, ce qui entraine un affaiblissement
de l'individu mais également des impacts sur son capital osseux. De
plus <b>la reprise de poids à moyen ou long terme est observé chez
la majorité des sujets</b>. La perte de masse maigre entrainant
baisse du métabolisme de repos qui facilite la reprise de poids
post- régime. Sans compter les impacts psychologiques et la
perturbation du comportement alimentaire qui augmente le risque de
reprise de poids.<br />
<br />
<br />
<a name='more'></a> Quelques extraits de
l'avis :</div>
<blockquote>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<i><span style="font-family: inherit; font-size: small;">"<span style="font-family: inherit;">Les pratiques des régimes
amaigrissants, en particulier lorsqu’elles sont répétées dans le
temps, </span><span style="font-family: inherit;">sont délétères
pour l’intégrité du capital osseux</span>"</span></i></div>
</blockquote>
<blockquote style="font-family: inherit;">
<i><span style="font-size: small;">"</span><span style="font-family: inherit; font-size: small;"> La reprise de poids
concerne 80 % des sujets après un an et augmente avec le temps. Une
perte de poids entraîne une perte de masse maigre (dont la masse
musculaire) qui induit une baisse de la dépense énergétique de
repos (principale composante des dépenses énergétiques). Ainsi,
les apports énergétiques permettant le maintien du poids après un
régime amaigrissant sont inférieurs </span><span style="font-family: inherit; font-size: small;">à
ceux qui permettaient le maintien d’un poids stable avant ce régime
amaigrissant</span><span style="font-size: small;">"</span></i></blockquote>
<blockquote style="font-family: inherit;">
<i><span style="font-size: small;"> "Sur le plan
comportemental, le syndrome de restriction cognitive, conduisant à
la réduction de la ration alimentaire pour atteindre un poids
inférieur au poids spontané et s’y maintenir, induit une
perturbation du comportement alimentaire </span><span style="font-size: small;">qui
augmente le risque de reprise de poids, au delà même du statut
pondéral initial."</span></i></blockquote>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<a href="http://adieupoigneesdamour.blogspot.com/2011/10/les-regimes-amaigrissant-ne-sont-pas.html">Comme l'a fait récemmentl'HAS</a>, l'ANSES nous met donc en garde contre la pratique des régimes
à visée amaigrissante elle conclut
que la pratique de régimes à visée amaigrissante n'est pas un acte
anodin. Le risque d'apparition de conséquences néfastes plus ou
moins graves sur la santé ne doit pas être négligé.</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
</div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
Un autre élément
important à retenir est le fait que l'ANSES indique dans son avis
que <b>le principal facteur de stabilisation du poids est l'activité
physique régulière qui doit être introduite, maintenue, voire
augmentée.</b></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
<br /></div>
<div align="JUSTIFY" style="margin-bottom: 0cm;">
L'avis de l'ANSES se base
sur un rapport de l'agence en date du 30 septembre 2010 et qu'elle a
soumis à consultation publique entre le 25 novembre et le 15 janvier
2011. L'ensemble des éléments est accessible<a href="http://www.anses.fr/PNB801.htm"> ici</a></div>
Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0tag:blogger.com,1999:blog-8245132312775661233.post-13205167660664326172011-10-07T09:21:00.000-07:002011-10-07T09:22:12.875-07:00Les régimes amaigrissant ne sont pas recommandés par la Haute autorité de santé<div style="text-align: justify;">
Lorsque comme moi, on décide de dire adieu à ses poignées d'amour, on se demande, par où commencer? que faire? comment se sont elles développées et comment s'en débarrasser? Les magazines et les média nous abreuvent de solutions miracles, de régimes divers et variés devant lesquels on peut rester perplexe et surtout se demander s'il sont vraiment efficaces et sans effets nocifs sur la santé.</div>
<div style="text-align: justify;">
Cette dernière question est très importante pour moi. Ma démarche n'est pas simplement liée à une préoccupation physique mais à l'intime conviction que mes mauvaises habitudes à l'origine de mes amas graisseux sont mauvais pour ma santé. Je suis trouver une hygiène de vie saine et non choisir un remède encore pire que le mal.<br />
<br />
A ce sujet il est intéressant de jeter un œil aux recommandations publiés hier par la <a href="http://www.has-sante.fr/portail/jcms/c_452559/presentation-de-la-has">Haute autorité de santé (HAS)</a>. Ces recommandations sont à l'origine destinées aux médecins généraliste pour la prise en charge de patients en surpoids ou obèses. Bien que n'étant pas médecin, ces recommandations nous apportent à nous aussi, des informations précieuses.<br />
<br />
<br />
<a name='more'></a><br /><br />
Tout d'abord l'HAS indique que <a href="http://adieupoigneesdamour.blogspot.com/2011/10/perte-de-poids-suivez-lindice.html">l'IMC</a> doit rester un réflexe pour repérer le surpoids et l'obesité, tout en conseillant de compléter ce calcul par la mesure du tour de taille pour les IMC compris entre 25 et 35. Ensuite elle indique qu'il ne faut pas rechercher la perte de poids à tout prix mais plutot le changement durable des habitudes aussi bien alimentaires qu'en terme d'activités physiques.<br />
</div>
<div style="text-align: justify;">
Enfin l'une des informations la plus importante à retenir est le fait que l'HAS souligne la nocivité et l’inefficacité des régimes amaigrissant:</div>
<blockquote>
<i><span class="imprimer">"Les régimes à visée amaigrissante ne sont pas
recommandés, quelle qu’en soit la nature car ils sont nocifs et
inefficaces à long terme. Au contraire, la prise en charge médicale doit
aider le patient à trouver un équilibre alimentaire en changeant
durablement ses habitudes."</span></i> ( extrait du <a href="http://www.has-sante.fr/portail/jcms/c_1102600/surpoids-et-obesite-reperer-plus-tot-et-mieux-prendre-en-charge?portal=c_63456">communiqué de presse de l'HAS du 6 octobre 2011</a>)</blockquote>
<br />
<div style="text-align: justify;">
Ces recommandations collent bien avec la vision que j'ai de la perte de poids et que je souhaite développer dans ce blog et mettre en pratique dans ma vie de tous les jours. Comme je le développerai ultérieurement, je pense que les régimes tels qu'on les entend à l'heure actuelle ne sont vraiment pas une solution et qu'il est important d'adopter un vrai mode de vie correspondant aux besoins de notre corps. </div>
<br />Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0tag:blogger.com,1999:blog-8245132312775661233.post-84131783466512106702011-10-07T00:52:00.000-07:002011-10-07T02:52:34.734-07:00Apprendre à bien manger avec la machine à caca!Je ne vais pas faire une grande révélation en vous disant que la perte de poids passe par un meilleur régime alimentaire. Le but est donc de comprendre les erreurs que l'on commet et privilégier les aliments les plus sains à ceux qui sont à la fois mauvais pour nos bourrelets et notre santé. Et quoi de plus profitable que d'apprendre en s'amusant? <br />
<div style="margin-bottom: 0cm;">
<br /></div>
<div style="margin-bottom: 0cm;">
C'est ce que propose <a href="http://www.desyeuxdesoreilles.com/lamachineacaca/intro.htm">la machine à caca</a>! Ce petit jeu en flash propose de choisir une machine simulant le fonctionnement de notre tube digestif. Il ne vous reste plus qu'à la "nourrir" avec vos aliments préférés et de constater le résultat! Le but étant bien sur de faire un caca parfait. En fonction du résultat des conseils vous sauront prodigués pour tendre vers cette perfection!</div>
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Sous son coté ludique et décalé, la machine à caca permet une première sensibilisation à l'importance de la nourriture et ses impacts sur notre organisme.<br />
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Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0tag:blogger.com,1999:blog-8245132312775661233.post-64374263487282137622011-10-06T02:21:00.000-07:002011-10-07T02:58:37.292-07:00Perte de poids: suivez l'indice<div style="text-align: justify;">
La première question qui vient à l'esprit lorsque l'on sent que l'on a pris quelques kilos est: "ai je besoin de maigrir ou est ce que, finalement, ces chiffres en plus sur ma balance ne seraient ils pas plus mal?"</div>
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La réponse à cette question a deux composantes. Tout d'abord, comment je me sens dans mon corps? et ensuite, ces kilos en plus et ont ils un impact potentiel sur ma santé?</div>
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Pour la première question, ce sera à chacun de répondre selon son ressenti, son niveau de forme. Pour nous aider à répondre à la deuxième question, les scientifiques ont développés des indices basés sur des critères facilement mesurables (poids, tailles,...) qui nous permette d'avoir l'indication d'un éventuel surpoids qui pourrait avoir des impacts négatifs sur notre santé.</div>
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<b><u>L'Indice de masse Corporelle (IMC):</u></b><br />
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Cette indice est probablement le plus largement connu et utilisé. L'IMC a été établi par l'Organisation mondiale de la santé (OMS) comme le standard pour évaluer le surpoids chez l'adulte. Il correspond au poids en kilo divisé par la taille en mètre au carré.</div>
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<b>IMC = Poids / Taille² </b></div>
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Prenons mon exemple, je mesure 1m73 pour 72 kilos. Mon IMC se calcule donc de la manière suivante:</div>
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IMC = 72 / (1,73*1,73) = 24,9<br />
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L'OMS a également défini des intervalles standards correspondant a des corpulences différentes:<br />
<ul>
<li>maigreur: IMC < 18,5</li>
<li>corpulence normale: 18,5 < IMC < 25</li>
<li>surpoids: 25 < IMC < 30</li>
<li>obésité: IMC > 30</li>
</ul>
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Un IMC considéré comme normal est donc compris entre 18,5 et 25. Les individus possédant un IMC s'éloignant de ces valeurs pourraient présenter des risques pour la santé du fait d'une trop grande maigreur ou à l'inverse d'un trop fort surpoids<br />
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<a name='more'></a> Pour ceux qui n'aiment pas les calculs le tableau suivant issu de la page wikipedia sur le sujet permet de voir où l'on se situe d'un simple coup d’œil.</div>
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" width="640" /><br />
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Bien qu'ayant l'avantage d'être facilement calculable, l'IMC présente des limites. Il donne une information approximative car il ne correspond pas forcement au même degré de masse graisseuse d'un individu à l'autre. Il ne prend pas non plus en compte la masse musculaire et osseuse. Ainsi il n'est pas adapté pour les sportifs qui, du fait de leur masse musculaire, pourront avoir des IMC supérieur à 25 sans toutefois être en surpoids.</div>
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De ce fait il peut être intéressant de se reporter à d'autres indices.</div>
<b><u><br />
L'Indice de masse grasse:</u></b><br />
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<div style="text-align: justify;">
Cet indice exprimé en pourcentage est basé sur l'IMC, il vise à déterminer la proportion de tissus adipeux d'une personne adulte. Plusieurs équations utilisant l'IMC, l'age, et le sexe existent pour calculer cet indice. Nous pouvons par exemple citer la formule de Deurenberg:</div>
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<b>IMG = (1,2 x IMC) + (0,23 x age) - (10,8 x S) - 5,4</b></div>
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S étant égal à zéro pour la femme et 1 pour l'homme.<br />
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Dans mon cas, l'IMG sera: <br />
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<div style="text-align: center;">
IMG = (1,2 x 24,9) + (0,23 x 28) - 10,8 x 1 - 5,4 = 20,12</div>
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la quantité de graisse normale varie entre 25 et 30% pour les femmes et 15 et 20% pour les hommes.</div>
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Cet indice basé sur l'IMC en présente également les limites. Il ne renseigne pas non plus sur la répartition de la masse graisseuse qui est importante pour évaluer le risque sur la santé.</div>
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<u><b>Le ratio taille hanche:</b></u><br />
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<div style="text-align: justify;">
Cet indice de la répartition de la masse grasse est considéré comme un bon indice de santé et de risque de problèmes cardiaques lorsqu'il est associé au tour de taille.</div>
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On peut déjà noter que l'on considère qu'il y a obésité abdominale quand le tour de taille est supérieur à 88 cm chez la femme et 102 cm chez l'homme</div>
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Pour calculer cet indice, il est nécessaire de mesure son tour de taille à hauteur du nombril dans sa partie la plus mince et son tour de hanches au niveau de la crête iliaque. Une fois ces mesures prises à l'aide d'un ruban de couturière, il suffit de diviser sa valeur du tour de taille par celle du tour de hanche:</div>
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<b>RTH = tour de taille / tour de hanches</b></div>
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<center> <table bgcolor="#ffffff" border="1" cellpadding="5" cellspacing="3" style="width: 438px;"><colgroup><col width="70"></col> <col width="62"></col> <col width="99"></col> <col width="65"></col> <col width="73"></col> </colgroup><tbody>
<tr bgcolor="#ffffff"> <td bgcolor="#cccccc" colspan="2" width="145"><div align="CENTER">
<b>Femmes</b></div>
</td> <td bgcolor="#cccccc" width="99"><div align="CENTER">
<br /></div>
</td> <td bgcolor="#cccccc" colspan="2" width="151"><div align="CENTER">
<b>Hommes</b></div>
</td> </tr>
<tr bgcolor="#cccc99"> <td bgcolor="#cccccc" width="70"><div align="CENTER">
<b>Ratio</b></div>
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Tour de taille(cm)</div>
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<b>Risque de maladie</b></div>
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Tour de taille(cm)</div>
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<b>Ratio</b></div>
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›0,85</div>
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›88</div>
</td> <td bgcolor="#cccccc" width="99"><div align="CENTER">
Élevé à très élevé</div>
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›102</div>
</td> <td bgcolor="#cccccc" width="73"><div align="LEFT">
› 1,00</div>
</td> </tr>
<tr bgcolor="#ffffff"> <td bgcolor="#cccccc" width="70"><div align="RIGHT">
0,80-0,85</div>
</td> <td bgcolor="#cccccc" width="62"><div align="CENTER">
80-88</div>
</td> <td bgcolor="#cccccc" width="99"><div align="CENTER">
Modéré à élevé </div>
</td> <td bgcolor="#cccccc" width="65"><div align="CENTER">
94-102</div>
</td> <td bgcolor="#cccccc" width="73"><div align="LEFT">
0,90-1,00</div>
</td> </tr>
<tr bgcolor="#ffffff"> <td bgcolor="#cccccc" width="70"><div align="RIGHT">
‹ 0,80 </div>
</td> <td bgcolor="#cccccc" width="62"><div align="CENTER">
‹ 80</div>
</td> <td bgcolor="#cccccc" width="99"><div align="CENTER">
Moyen à faible</div>
</td> <td bgcolor="#cccccc" width="65"><div align="CENTER">
‹ 94</div>
</td> <td bgcolor="#cccccc" width="73"><div align="LEFT">
‹ 0,90 </div>
</td> </tr>
<tr bgcolor="#ffffff"> <td bgcolor="#cccccc" colspan="5" width="420"><div align="CENTER">
<span style="font-size: x-small;">D'après le tableau de Richard Chevalier, <br />
À vos marques, prêts, santé, 3e éd, Erpi 2003.</span></div>
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</center> <br />
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Dans mon cas ce ration est: RTH = 88 / 93 = 0,95.<br />
<br />
A cuase de ces maudites poignées d'amour qui ont inspiré le titre de ce blog, je me retrouve dans la catégorie des risques modérés à élevés! <br />
<br />
<br />
<u><b>L'Indice de masse adipeuse:</b></u><br />
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<div style="text-align: justify;">
Face à l’imprécision de l'IMC, notamment pour déterminer le taux de masse graisseuse, une équipe de chercheurs californiens travaille à la détermination d'un nouvelle indice basé sur la largeur des hanches et la hauteur.</div>
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<br /></div>
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Ils ont ainsi développé l’équation suivante:</div>
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<br /></div>
<div style="text-align: center;">
<b>IMA= ((circonférence des hanches en cm)/(taille en cm)1.5 exposant)– 18)).</b></div>
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<div style="text-align: justify;">
Ces nouvelles recherches qui ont fait l'objet de publication dans la revue obesity en début d'année doivent cependant être poursuivies pour validation ce nouvel indice </div>
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<br /></div>
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<u><b><br />
</b></u><br />
<br />
Ces indices faciles à calculer offre des indications intéressantes, toutefois ils faut garder en tête leurs limites et savoir qu'il ne sont pas forcement déterminant en fonction de la physionomie de chacun. Vouloir entamer un processus de perte de poids simplement pour rentrer dans les valeurs définies comme "normales" n'est donc pas forcement pertinent et une discussion préalable avec votre médecin à ce sujet est conseillée. </div>
<div style="text-align: justify;">
Dans mon cas, on voit que les indices sans être catastrophiques frôlent toujours la limite supérieure. S'il n'ont pas été le point de départ de mon désir de perdre mes poignées d'amour, ils me confirment dans ma démarche. </div>
Nicohttp://www.blogger.com/profile/05695931791784656133noreply@blogger.com0