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Grammar Point: Present Perfect Tenses
What is the difference between the Present Perfect Simple and the Present Perfect Continuous?
![Risultati immagini per present perfect tenses](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASYAAACsCAMAAADhRvHiAAACE1BMVEX///////7//v/+//+OBASJAABGAADv8fD06eqzr67w7u6QS0tcGhfV1NTIbG2FdndgAACrXV47AAB1WFmzo6SAAACopaePAQDMzMxKAACTSEnGra3/+PhsIB7Ft7P86+yQe3ukkJJ/IiRzAACDAABjPT25ubmalJKWAAF7AAB6SUhsAADJycdnAACaAACumpelAADaxMOWY2KMZGOjdnWvAABaAACcdnNRAAC2AAD/9fP//+//7/fg4eD/+vLTnpz+6OB9AB/Np6yeQjMgAAApAAC0p6KELDfsx8Hy3dzysq3mpaenHh7frK27NTWLNiuKKhyxdFvPsaaCQFDaqp+3fIqfZGOlboK8j4nGn5OHHCCWQD+2b3aydW+/kHeIHjPax7j/6tiNOiHs1+tpEj2zV1H/5/flxa1/PTTmvdelfph4EgDIl6KLaYBmABergW93Hjmzd5WkVXPhq5eXT0KykqSWMz68jo/JjIHXqbrw18KfTmC/fZDCjKeHTVRzJCpjLSubZ095QTZ0SWeJUmSuiZ/EpJPyx81PABnNkn7AYVKMJADTfIvLr751PzDijYe4UFSoPzzAQkT/0cvrj5HAJC6iKSbddXNOGxxQJialVVhrT1DHuKfRTk7CcXS/W12qXExqACrldnHko63MBgDFdWj748JwOEmPcWF9P2SYSzRDABlnQUuOM1D4x7nTnr3ju5f4LfobAAAgAElEQVR4nO2dj0MTV7b478xkTAqFRus4YkZGmVEzxsSMAoUhJCGuMmMIID81SIUvFWjXp7ZaQWi1b1/brNvnFzFt2rrfBt93l+3b/b5290/83nvuTBIgWBUFjRxDTDIz9975zDnnnnNn5g5CLGIYhmU5luFYieU4/HqDhWXpO8syUUKFQVRYhMGQhQznrnLD6w0XIOB2E15YdQqYCCWWc7vbj9XX+7aFSH39sRpCCouNiSF2xrrdVqLx5InqbXHkxMyxdjd2Qg4m0C233jg0OpvP124LkaWlxXSg+nhNVQETAkr1d0aT+QcjWKqr973ZQgCMjCzmcoH9MzXuojaxUpU+nV9Y1B7FTBmRfu+NF8uMPVJUpeVggROHWMm6s7SkNaQM3PtxW93CLRYIBsgHOaaqgbePt7sLLrxqpmFJ7czgZSysyODej4YKeCnhCB9JDMHB7/g7XhH+Rww1W/wDfuFPlDxeCbs8xCAaiLBQJv7GILsAjhwQ/GIZuvorI2QPcPsIBTOtNR/V3XQfGdat3110pTOIiZK9x7vHkN6PIYECQzDh30j0CQjxEsKGBF8siUfhj2wAmEjhZGNkHxb6TjYiBcFSUikLbxwUR9bcajRlBTcrlVaaD7a7cRPJYa+a0XJKzN4viD/pDtGIFL4yOCQlu8VFqWoiWDMK+kVCMLKzwIGsTJaBnrCMbcIsDfM5So+hSgZBCcO9mpCI1rPMecV76FgVYELummmXOGIgYjP4ByAHNgW7wILZcUyUhvLUfDkwORLOw08sAyaGC7AsgokaGtUkoI5QgQyhSY4C/koVimOY32zzFghpMxO/Fajb3U52FrFVvoBfSSGy0wh58rX5PobuGtlZVDAkqmt0p/Dv+Luer41ZCJSJeBu8Xj4UsEDZ6OagK5yFg7F8Pi9zRFM5YqTQmYIa2sq21UzKCHXRsUDLOzVucmylqkbFlTYQOcIsSoa7wq15UDPYATApzvbc4FlYZGI/hqFIS03dTa0ZZBtblENWKG8aZEOI8Tl2ZJasrqe7WptyaQsfIAbwI8gAbOQE3BYTKSvQvyAr3YytjvQ2UvsJRR1FtD/CmM7KP4UtM5PKIE8qZSFkpZIeRtKTGQlZppU0kWehtdbEWxpLrXK29REyzKTFsKaZSiWbvjcN/S8ZjMFKpYxUU3fKwyFJzn7XHZdJEQwtAmPMJM0oiqeSFulNtxpJOSEWhVVhqPmHt9pJH8+2H9XUFCgPPqzJkIkWQmauK5TOLLq6cpa1mNN2olp/LpRHy2G/P2zq/r82KXh1rE3I6B4xlsScKykthkJ86K9Ni3hNfx7pXS7/qdxfW3md9Bie7oeIHQyRBXl/lz8UQ6lQTtOtRVeuK4OYV9I50Z4MzXh3nGknGQtbMy2oJoLQhmGwQiSbHmS/+860HnZns635VPisZZmhb7P/V7RqW/+SDV+Wkq1JC3sZaan1bG1TLBk6m/0pF+9uOptJhb9Nhhey34fkxe5MdiYTfpgxiOUSTJnwt9ZCyPq+adb67qGxs9XKGLVdmWzrkvRqahONMZHp3XGkhmhT1bG7gmIhcDEYU2tYW7Ss8PeICTeF/OFFyx/Oy7HWMB/2Z/LdMvvgoZQKmwQpNjpVXTBqW7GKhTMPf2KQx5+KtYb8oXAqvBMbU6SrlgaQMsaUag2JeMG3XXG01GXEwrkU+5BUkPOwr6IHR+BisZPw1h2pIYG4u/6ukJZJB09deBI7YQvvoNT0MBZLZlA8H+6OtS7EYjGptluWHnRHCSbis5eaLIlBWKFiyZTx8IHEWKFUrGkWrxlp3YlLlnEpiAQGgKkpH0viInIWWuqWkbnUFHvYlYzFTBrZv4JC+ngke+sO2pj2Cw0GA6ERwYTtDzAhbHQZ09LN7BLWjgUrozNLFJOOv0mAiewiMTpTl7ofSCzGlAktZDN9eNuz5hDb9TDjIX2iDEaHF+hRG5PPzLSOft+FtyQRxVYDKS8OpgM1btzCKgcTImO/KRX38KyVHsV9V84fUvtSfCi0gJZDIVFB+ZwcvbwYlR+GNeKbHoVIgCQvYec9xNy6jHtCLYHyYb+oIrMrFLqFP6s6CTSMxQeImQ2H/Hw0r8WZ2py8UwyHTAu7fXXmFXXhBBOimPaWYoIIifXoMiFQ48FBg6yndBwKpHSclOB3mfHg2JHE2VaKBJGspUMOI+m38TLLYvG6HiTBmoxlmjIyxnQDegwLB014Kz2Oy4wyls7SWINUIDGvsNExazFBXwfeHdIshmZb8GcnFBBykvUQrMmRMB3Zw3uQyXF2igZJIIwHIMhuaWaIaHFkA5LZQGRJc5+tAvFkKdEmVMTkpFeQ/0PETbPYKMPRvIWxNQ5BusHBIDoHCQeMUkF6a+d7nJO0Qe9pJ9U0OCeEWAhyMSU4xcO9mja3LiYEyS3oAowQUDb2znH2QBR1JJA/M3QpQzeiXGmGCyS4kozHLokDVYXkmeOi9pmxV5RSOUwSjA6wjp3RnB7W5Yrv9k8cfAe1AjuDH4qDa/h7tFgX69RobwmQ7J+YYpmvopTDxMEQAJI8b55IqHxMwq3o6dw2JjJ8pMcu7nzT5NGQzyinSwRToadjSzBFL1y+pan8GyYuPvhe1dNj4pi+NM+Lb5a44N373tqYZD1MSN7Hu944Ecmferfm6TFZAayB/q1u9+aK6FLxO+/1PT0mPUBszvVGqRTeXdUl8t7daxKm9TEpmNAbBQmLn/gnl/f4s2ACQy1T1nrsNsL01TgeWJWIQj0bJmdjbHwqACP7gv9TRfIZd524RBEbpkph4i+iyMM6eIlIAfOqUwj+J5Kf7XJcKi/yKi3VLhOKpBWRJSJ8EWGxi4eCXaJ96HC1dql4Uz/UodKaYGWynvrcLoP3Hl9zhv7JmKCp2sVTJKIQeEEFDiLFAnusuQS7OU7jKTIeN1PgYR07qvA7u0V3WuBHHkNZFBP56xyFKA065gITeyMa05TsCuCzNxWdjTBcx1WoD24WCn52TOwzYiJbzWf86vy9joF03znR4eDyw26nLT6zrLp4VRX9xeMrCvOzHTc6zMd8AQ3VBaqWojqTms+II3HV3kn4U4WZmLqvsbFRUB2VwTAwbcLc1UkW0JJE4MfjkhpGaajD79vpsrkGxnN+qI3fmVXtUjYBE94FbWZA7cj0JmaVsfd50kgXPbJEJTrbAtZj3rEOvDpd0JnJ6ctX5845GsDDvoJFEjtT+i4MmaI28Sc43g0j1EwxViERtaw4T7TDRdVMM0+RXRWuGHgBaQ1PqsekhwdU1y1LhC35wZTtB9SONsBEip1Y5FXx2SE9pzb5g5nHwnw0GB1Rxq41TGtYIzqne7BTapju1a7cm58SSNFC5/Q0L2oNgZFel6pdHA8wWsfcuUvTWDPI6rzWw4tCOo3Bdvaq17Pe1GNe+/yGSho1OwB2zH+SVYXE14Gr1rJGKnDx6ekG4bo01IuboV3pCwYnFgRYkO4URho+HZvuVRoEUnFavZpW0w1afw/v0tpyotow3cDzyu331efRpefUJv9/yaf4W6PKaC6tj8VZUxCuyFJkWb00yWRzF/n5HNEiZVCWpBvaJcuMLosuYWQ5PSt2WGNxdBbvoSEZf0pnl13BzIKSkCLZnluPtIu8S/hkCu8HL4wOqOTo8x9lNS1xQwhMnBuUo9KsdikjxXsnUXQOq4kyc0ML3J8dxrXc0y5NmNJZtq1t+XpEUwYNSRYHTa1/0pSkAUFp6xWGZMkYVbXBfwni87rw58DUb/XypEPjO/Rx5Y+Rc9pM8+kv57Qr+q7FnG1Mrl/kx9670p+uG197iaJDV9dhzSkfRP4hDDb/7sCcciUl9Fu5T6zTv9t9QwBPrf4yLvDaYEK3EhfwJsJXZzXttuXTx8XB/ad/jguf6zt6euvkngCuW7sST/jaXMPTp/9fm3o98rW3eXjKq30gKfPyP7xD/o9M4e/steaT8qlAW++liaOn/yeeE+b/pvGbhQm/CCbiDzCmWT6YOafNW1FpTuicNHeqLrtjHjSxxd2/d33uVPEAYqMTicEOWxI7p/0iKTNTgX+2GRL7q0oKFrVf/qbymLZl6QP4MAifYkwJy9cnqP0ZSRrnL1nZIUGJLIpgdB5f3zd4QVSK8tetUy7+4yme/0DSBuewVxQIJlkRr04sK23qJ5Eo1rBTGsb0XDb3rJh46sKvW700pukw7+H9PheYvLb/3+YEreO9+GPe7v8HTYFXPiSYaDeD80eMaVlszj7unBy9+9GUGjDfM88p/+zbP/1FmvZkGBPxx9rogEC0VcXapPTdEFRembyw/8vxb7TAsLUciCySI6HNTOFgQZgY2P8/cf765Cle/XhKFT8wtME4z2vaR6b2dzmAMT3GmOat6Ya7d3mC6bkoPQcmsj9XJ/8hQk/WMXZP9GbOdUTOVX84p14ZuoM7OTt06YxcuDNjfAOY7FBIJNp0NfO4MzJaPTGnqsOerEv9xBi607gMyilqWCFIbw4uHP80nNWUxA1cqTI5e+f+uDCIK8DHZPYm6elmsPLgvjFWfbuNYMI9XXwod11Sfpk8fyfR9ZGp9LN91VcsXmnLXbIGqu8kReWzfwlQzyZhwgpEg2Olb1lUUsval7KRmOI/iRgx1U8x4UDJE43fFC79eopGnyrBZD4WA5nH2nDEuDDFuzoiGIfQGDGsUzRU0v55TyWaNzIC4ST/y9w3WoxgUr+UI4kpcX7SGHBpg8YUZqmev0HMvn8y6vtV7Myc4sX0hLF83RK0ixFjjh82hf7I8Yj1WFXiOb5/woiOili5VZdr8zAJM6ZAt9dUF4R7mqaqqqBpAk/CZmqRmoIdpqq5IHyhMQyJHbA9qYpGAkNRE4gRa3hjWnDHRJcTUUGM2GGO8nSRiovGvZSGDZBXBVILDj4h3NQU+A1Hsy4N14erIwWSxKQ/HtQUlaQFpBl4WedEDg7ZJmHyi9czp+yRGJqggGqpTtZFcxfysgenIMKkCRn8vCKzosE6fheFi3MKpBdQJtGY4V/p4RBJv0rro5Gik5QAT8IEfhXtxvB+Hncl/bJmtwx+c2mj/8LHxS+qz97ZPRcmFxxJR3npThOX5KcGR39Qi/tl52N84Ytampw5gzN4ZZqUFFM3+MHuE6BY7LPpVvClcCxAW/20jEJNJIFUyc+qSyym1pvV0xX3g+4MHQyAHS9wc5JSTK6YEhf2nW7sHFOVp9tCxu8kprz9J4pOBQUBL2eDL4AWKU1HrwsJo+o0FPLngnZvDiZoh2i7HJcznCEWd875taDvVL/4wrqlB5W3M1p7XEYs7vxKOi4n+bVtC7Sp9LhB9Y7d2YMKtuo6sMTnU6Znx+QYC18cKnG5SmqnfX9hEIhEm7wKCxytwF9pX2j7tgJae7REtcny9sGgKxVUkWpXwZBstLzLcVerhwD44uACGYngn4vTM443FTGVFGG/qY5irBgEcjk7XnBUgMn+YPeBpSUWVHSlNhW/qXQl0Em+VKWLn9ZgKmz47O6bDoA90+hl8PmOxWst9IA1n1lzdnxdTJ67/PMl2K+54B7z7frVlJ5w1ve9IA0DwItsxb9y8rJrJIGN9932p8fEWUeDb94lBDhWa/6xfu11jesaHcNaJ99u9ga9b5Y0t7xbX/X0mMhVYO5juw++UXLkyMHj9e1cmatk1zc6uJSXXiX5CghH7w55uULnYyh3YeO6Rge3YG79Vdqk5cfqj9W0uzfhhkS4fpSjtw+uWrIeJrhp/GW36zeEhRuBjUOnfzxyuHSuhJclDL0etMwVoOtj2nrh4H5pxji649DmYFpftjE9lWxjeirZxvRUso3pqWQb01PJNqanklcBE72pau3v25iKQqe2YLYx/UYDYH4j+3arlbKNqaQBnKUjVPauzG1MRWE562pCYji0tsptTEVhkaUEEwZXxjltYyoKhzEpwZh72+h+owFWQNOCqTIjq9uYShtgpTVN8MaMNRQqBhOD6FR79ldy5zf9sHpFZwEqY1tWQNAELUg4wYRXxY0qAxOOCgHTBptgpVVNEAQl5rHnNyiUXxGY4JZz/Hb8vZXS2Ij/4P+nkyFNJRfGASemdGq5ysJ0sqUZy+oTXsFSCawVpSiqSi9TxJyk0nkvKwUTnKZCJ1dCWYeFomjkr0QEKip+qfQ9kJJZrtKMDk7l4RVPetcyUtaKtlocTJiRqvKqgF/BWGlcUCmYEExb6WBaT4vWBQWUNKpIcH2uqiqlcUFlYKIJq4NpPcfzBEKgSuSyaaxPQInnecypkLZUCCbWxlQwOW+wgCkIdArA1lCySWH92SdQTPYVIUqsyvFOFYLJnqf3JIZD1Cn4s34TOHn3K96xNKHTeCGwv0hJaQgSRLhbw9FkwHbezVJvQZWIELuDiX/p/D2vPyaYzhgRF44x4Vfzfc+/vEpLXct1q6fleNAbaG45+d93rR6vV8GvQHNzy8xUS7C5OYC/7krc8HqbcfjdfDrSW2QEEkhV0QsrKgyTbWp1cv9cT8uHKJVBbVrb8HjvcOa8/iFqq53zfno28F+R6BWp7cZFFsWuTo5npLaYzsaVQTQpAyZ6aywRFx+gcSZXQZgYGxO2ur9HDxjX/kPa1XjUutnSdtVqNBvPj/1s3Ww2quND2vXI8bc/nfL+fPD+3B8j/2jxff1l2wHPxblrO4zV2kT8k0zm4qs8TNg1Nd+Pt3umfjbene2faPS2/f4r62/B41PXPdeUT60pTbt7cO79z+d67te/NffHuBBMjDUaR453mhdORnt5fgUmcr9OTCaTZlcepoDSPNHT8rN593401nzf0sZ7+ycHgue/Dt6Pq39nzinaL5G5m1/K7w97rIGr2W+UYfn8fc/4yJcRPdu76upHcl+Fhu3OjssqCRPu+ANeYnsBHBUo2H0HFfxZUwIa1rP+8R7cvQVwN4e7PCWgCIqgQo+nCDiB0Vy86ip6JnorAtYno+J8U5BESGsSOM35f36UhANwC57GQ8yk2kKsDWYv4ME92Rc1w/wNSspgKwuTE1PiVzBgh0nFN6w2Cg2XIC+xkxMVgiXeIaRShaKY4E4diDMrAxNagYmanq1LAaVISShN4SCUJLdcwrQe2LrUEkVylc5gppE4k0wFSDG5t/ISxw1h4hxMFE9/NR0sIRY4PLA6QyE5iaBityRQY8PvOEe5noGbWvk1lLDdabEqMpppVAwm0KHAVwOgUVpw6F7LR1NBqk+CFoB38obXSVzWyCgc9uHE/FTtg4hCZ3zg12ASRQFzqjxM/3at/4pP/73S3z5+7aMx3wWlWR+7KSjDM/rXyrA+1tN5v/6iZJ0Srt7WzyufzejXtDv6/SidPaMMJb9fJHbHSBWCyfZIwa/6/iPii99Q+vW5f/8o7htvvK/Xz/GBz+PHjdGTB8cGPpMOzkdMjOnTPfHpD+OftnVY+u5owL5NcLUqgWipKiZSMZgUB9Oc19eneQcHdn001TL2XmZs9wwf/LzvtH7+/P2aMe/xuDCxrKidmd3G/779fkvbpfHpP0oK3G9adopNrE9KzPA4mF7Xnm4NpjvZQGJACw4zA8NTQaux0YgPCFib5Pi+lBzv+085/s396J+E/ognPn37XiCaThgTssbbU12Vw+T3C7F4ZWFS7k7vr1ampzXNe2f/3RGtuiFw5+i0oHw+dnRE6bwz3dlQ3SPcrU7z2r47+IceoZrvuDMyAhPRlcOEdclP/NPsH15zTMjBpGn2GCW8F+NJGIz77GsFggEyWEmj7UJgaWco62Ii76KroSIwnXBSE40mbVqBkQCJCczYoRb4iIDKZU/64UxPyPvX2hvh5A+JYmAXYNrK6ftfDCZbk1aEk2rpCSY6jKsKvD0rnTO5Cp3Tz54lZA0lEH7fFxWCybY5xTkbACoV0CCD4wunTeCNIKPzL6j8/Kg9jQxMJbMGE1ElTKn6+CGKaSsvwn5BRoe5OLkupCsnegNz5wQ6LqBqtkLhPCU9RKfpcQkjj7WPpwQyxSjvd1CtNrlQKKRWH99dKZgIoODJauXqiZMNgerqEw39k+cD/90zMn1yn3anRzshNJyoxn/7eGVw/KbQeWJIEzsSUz0fj1Xf5LWhIW1VBF6wtxDRpbfqD+14/Y2OI5hwHndbln+vy5G5uknLmPqMHb81vvNK3BPv/XA0EG3Q5XjjFWNA7Jhsm9qXiRiz/Pxk272PZWv88qAs9/GlylQCKcTvO/7WsZqjFYIJq9P1iX+/OzL++w/i+yf/cHK8eeJU8/jQ7b5d8h8+POeNzsfr9YGL1oyqfTnX/JW56+AUH5yZavnYbJ47nxnzmSHR76Ldf6nvJt4bU2r3HK2D8abXNlkpaJOmXZ0Y02/JvvrxFvl/nRhXJsxL40OJgZbJ6Q+tRPTSZP2Zo4OHx3PaJ9H3hyM+6wavfT5+7uOpwFzj7b1nrhEPbkdJqyjtOdYuRZxhuZcO40n7+mIwKdf1WLD/fl+PN9a774IyrKcvjFwcDV7pues7f0Hr9/UNDdafE3jF935gUI8FXHyn79z8rHp+Z+B+3/trowBic8QvYUpIet0xcRSTHW0740s4DIAzAmQUDvdr5Eo4GK7UnNCSp7NCkyyFh2myymAK2RbnZhnpdR/kXYFpxXUmzkVLqhNK2pEknZa4/BM31ujSGUKpUjHBKROIKmnKRicG4/nipF7rDJqUMAr5RapL5CnKr/0pg1WYCpCKCZyrkN+SOFIspnFP1KRQyLE4FlWaNpUwUu3LlVSgBBN50Zn6SL4vulZnJqu9Usj23m544DaqKEzCCkwqnBfgeeqiROzBecE+J5ceFVblJqs0ydElCZ7YVrmYwN46H50YEkaGLqrzjTe16sYRZbAxjROTRm04/v7qAYGVbslv6xLL0geSVxKmovem53CF4bguzzbK5kVLj9+yrIszlpW6JVuR2dvGXNcTnHcoJDqUyLU73GuPiWzN2JiKgQB13rwwbLYkUo26d3D8oHU5pZ8wcVIyIiuf9l03e9WVcETHKcGfaEeVwIg8UfN1x8TZmOAaeHWFZ3JpH8t947ODpjofqf8/nffbU4ma+vOdBv9V3yVrCiblXalKRI3A5LBfsuOlCrmoEDFgFhhTaQ+n0t5f+Nj6+oLyaFTUhn0XLl2J9QYTfaPpGXF+VGu8YA9zAybRIVSIBM7QPg5VCCb7aaFoqGBwJZdyCcO/wrg3GdNVIe5W7YfG+GlcULQ4YCSuiJfg+awVg4mDJ/KeWOGXeDtgSjdAoASJCW/3//bwm2uV56ajuUAJ/BI8+LdijM6+tYc5UdCk0iuWeJqg2E+pIVrkWFqJ17adtp/6pZDL6ePgUcKVcrUcnaAPDa25Etee69iJjegH0BqxYGclgVKIBpUhcV8JJbihsxIwkQdhk7sE7VMGZe63UOl1Tc7JTLBMeplTScQuiBgQ8U50FM5NYm9a/WuE6Um8GMDEMZ76M7t3n8F/RTmzZ/eZt+AX/PsZWHgG1iAfdpeufubMrAbqJNqU7Gkb7Ydss8yrjQluYmZ/e+JLvCNVNcfWkb176X/rLYdlCTVUiCqrVlbHsiWXgdnPbt9MQfQ2b259THAwidBHgQNTbu1n8gB71l21AXGbrhV+qVA+PLcd/xWjcK58G17aZ5jUkoHEcn1MLMwRyr1kYZEp+B1KHH3qfVHIlKaO0TFonSJenhSiHnb9yWbJgYX5Zn9TnmqldYRDpuovUmJp0Aqlwmy3JddeMk8o5mWJbVLrz8m7aXOoWi4XUFqvt6BG1+7epOaslSdgIl1Mze5NkRlX+uQ7Bw4ed7q+1cuPf9Hyxcni8s2Xvey6mIi2n/ndrh27Xr7UBXecPv2kFXbU4WZsRkvKVr7rdwcJo/Uwcaj+z+9uivwZy+bU9Fzy57cQzORc3jchVLNnE+QM/jtyZDNqem6podrElJ19HnFVJD60pfhpLwSNe1+klNZzbPXvx1Z9frFVl2vN6kraYaL1sphIRANRo9tNXlVtdiyIP5KfNxRQPinWJOW73fZn8sHjgc9VxR+L6228Nrtw+nJXeWjxtGb81V6PGB1bFhOOp9goDVQgvyLzD3EQbTI0Ni43A+NzCQQnMCJASpegj8W1QWpCkhWJo0Enw5HmSBA9cRDWseUmy3yWihkJJpsn0U9UoqNC5AeSqJKh2Si5f500i1ztVh4T2SCKyI1/iLOnrYdVQc+A0IuPq6DNEK/hJpJnBDB0pIa88I6QKVmgyWTADtq0wUugOSgA9gNmniCzlJJkHjI0ureIsOK46HqYYKIYJMeSSZ2F63NI4kAPMw3OXzwmODTIGMBVRikxjgblpOWsfdA5OLpRBmZo2WgTYGZSM5lMJmz9xFRous2BCTl6DAa1rm9CKOXvCoWT9PhCBsiOjsJcFpDuvRg6jnB0ACDjz/nDsxJNfalN0AScNAHAcMha1AHjxoyOojBy4S7/PgmyDoaZGXKSbobOFEycD03rymsTTMuVDJ+1fgpbVvKsxDJyKmlkurozBmn8i8dk+6OzTbHsUti0rJSJjMxZmWWMVDKColYyKzGyJSezSEo2LWcZdqPekbg7lpW/e5jNyIYpM1HTyHaHMrJssaxlIY+V+YvEZpIWPLykFBMqxYQVG2My0UJTraqJi5L8QFUepVtbg7tfDiYG/CVKhftwtanFsKhYi5rSZckPBOUOGxM1IYnyYpdLTFnqX/1eiTZ8Y1XiOuXuy/iTqcWQpaSqW1uVmUc5D3t5kcmLYSU1K2pqEhEnXRYT8QgYRLLp21Trw1TKWAibevisnLG6uy2JpSbwwjERYVNNC6nvcmZ309lsbVNWbt2ZCZ01xszwt8ZCyFoI57NdD+WzrbNyYdzsuQUcD8YUfrh4AZePMqGU/LDLii52y9EH3VJtU232bChpfB+So0SbUBETwpju2piIpiWbQvxiRkrV5lpNOReelaXFh4ijHfILd+HgiVCq1c8vmnL3EmIXW3O5pkUzF16QU/hjVzi10GWhpW7ZDKA6X1oAAARkSURBVCeQ7bA2Uh/p2Ti5+7ulpVgmvEAwRR/kEHrQLUsYU74rjmJQrU67eLQSk9ZgsAydoTIZHvAYaDScX2rKICvftChjTAzHbjxoWSvQiTLIbIpZBiPnlpC02JTPLydYXO+DZOtSPp83vu/KoqUuI4Mx0aGgDdVI3Db2TZejEiKYsuEU+yDH2JgieXxIZltr8/nZCJIYqhe2C8eYjn2hpWVq9iz4Jg5rkJxsSsXH4t+74iPY6Ox48wVjIu0gLhz7Jo4Dbdr5XTZiWZYuf+9PhRficoapzWFtyhkW1muu7EOInkVwdVGKieGsrp/iC60ptOS3pHyTaYax0WFMqVCSeHQSp5GxJSQ37zgId6y5936hKBYkenhB0pXBzc83hcMhM6V2hZei+Va/j7iR4ryoL0pIx4OrTbkAU26JYcyucJc4k9JC4SUjHw6HtWg+baGdOVnublUNjtmgNkEgiWt6RA467OMA9jLhhBnGnx9G8y6Lky7jahUEmGAyagdTVc0fAloGzi3hRnt8Mj7I0b5EJmFIesIXQYYvITN0dPgFC5y+4JDsk7Hrk3Qd70Y84fPhen2JCEveLcbySYyuM8jy6ezGn1FFXDiSfDoZAJASvrjPw0p9PhmXblo6a/kMRKtFjH0REdJbCCbcSnfN0aCSIroStSMue8ichqh0FJ2BFOzF0ClpNYJRLjjI8PwzkgfQCy6c9IiFyLtwUmyjbbDjfDh9glCUofEqKACDk0vyA25BlIVQlqxzvu6HPTWQ4bS/16yNkhIgJrAvFIBQmINzl1GIz1+CbwKPzEKKC9kJBx4QkhPIsliOJhI0bmDtU0MbEZY+bQKxtEQ7MSKHC/YbWsBwNDkGVyYN7Tj0VjscrfbjzUraIGECzUPJOpArM0COFvZSAgKWRmPk8abIOXNJUwXo/SFHouEcoln8BltAhztYez85OioAxbKcnZHRJBiODVld3r/j3cPtJEHmquq/CAZSNHumQxxU0xFZCJgg0UF00Ys92WOnuqDLdHQAuEAMDJdiwlqkmYjGexuqjkAmxdALYSkmRMcIkH0iDFGzsl/IV7fjwN4qOKRVNSdblEdk7m6wtq28ie2VEWL5mJlcXffjnho4Eca428+8HcDqxDqZ+fOce680gWFINNMCNgeYmKq9J+uUtElP4m11+7ZcgAkCR6U31x06Qm2OYKo582NzcNqiI5WvzKNYt06o2SHz7bof3nnLPjeNbbDq2MEfmr13E9GyTx54M4UxEm/X7Xh3z17n5keWdbcfPvBDS3OwOmF5tgXEStxp2YEpHXYudCD9obvm8IFDdXUtLW9viy11u3b8+M6Rw+1VtnZB8IY5HXzn0A9v79gWkLq6Hw69e2DP4Rp3tCSi5bDdHTu858iBd7bFliNH9hyGG49XeCzMqebY4cOH39oWKocPk+d5r/HsrNtd1d5esy22tLdXlZ2jBcfn7m0pkfUHI+iFGM8QXVSmlH1WuyMs++IHlF5bWU3i/wM9wq7gt4ScbQAAAABJRU5ErkJggg==)
![Risultati immagini per present perfect tenses](data:image/png;base64,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)
Download the slides in order to find the answer to the question.
Download the slides in order to find the answer to the question.
Follow-up activities VC Thu. 23rd February
If you have any doubt about
If you want to learn something new,
- the difference between the Past Simple and the Present Perfect Simple, study p.114 and do #2,3 p.115, #5,7 p.116
- the difference between the Present Perfect Simple and the Present Perfect Continuous, study pp.130-131 and do #1 p.131, #2,3 p.132
- indefinite pronouns, study pp.257-258 and do #2,3 p.260
If you want to learn something new,
- study p.129 and do #1,2 p.129
- revise p.130-131 and do #4,6,7 pp.132-133
It's up to you!
Notice of Cancellation - Listening & Speaking Courses
Lessons will be cancelled on
due to remedial English classes scheduled on those days.
Group 1 will meet again on Tuesday 28th March. Groups 2&3 will meet again on Thursday 23rd March.
Bye for now!
PS Lesson will also be cancelled on Thursday 30th March and 20th April for Groups 2&3 only!
Tuesday
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Thursday
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21st February
7th March
14th March
21st March
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23rd February
2nd March
9th March
16th March
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due to remedial English classes scheduled on those days.
Group 1 will meet again on Tuesday 28th March. Groups 2&3 will meet again on Thursday 23rd March.
Bye for now!
PS Lesson will also be cancelled on Thursday 30th March and 20th April for Groups 2&3 only!
Notice of Cancellation - English Course for Teachers
Lessons will be cancelled on Tuesday 21st February, 7th, 14th, 21st March due to remedial English classes scheduled on those days.
We will meet again on Tuesday 28th March.
Bye for now!
We will meet again on Tuesday 28th March.
Bye for now!
TEMPORARY NEW LOCATION for English extra classes
The new location for the English extra classes @ Liceo Classico "V. Alfieri" is Aula Magna on the first floor. We will meet there on Tue. 14th and Thu. 16th February.
Listening & Speaking Course Lesson 10/11 [Groups 1, 2 & 3]
Topic under discussion: The British Museum
Download your worksheet here and print it for our next lesson on Tue. 14th or Thu. 16th February.
Listening & Speaking Course Lesson 9/10 [Groups 1, 2 & 3]
Topic under discussion: London
Download your worksheet here and print it for our next lesson on Tue. 7th or Thu. 9th February.
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