Mathematics
Grade6
Easy
Question
Write the mixed number.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAA3UAAAB+CAYAAACDITh+AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAFMjSURBVHhe7X0HdBxF1vX3//8C+8HuwpLTAstism2McVQyYJucc1pyjrvk4JzkKMlBtrGxjXHEOWc55xxwwMZJToBwliWNNFP/uyXVuDUuSTOjCV3d751zz2l1laqr6777aip09/+wsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxsbGxlWv/pxywOdh0hFcENmeZjuOKwGa+6XitCGzOMh3HFYHNXNPxWRHYzDcdrxWBzQyzcvZ/Nfh/AVDnmWODzUq6jvhA0stD4P9ay2Wzt1m5CuRRx3VZCPxfa7ls9jMrP4Hc6fgtC4H/ay2Xzb5m5QkI5FHHdVkI/F9ruWz2MSsvgZzpeC0Lgf9rLZfNfmblJ5A7Hb9lIfB/reWyxdd0/Cre/rStTb2bczqnvHw4rcHAI+kN5h5Nb7D0eNcGe3K73X4ImPbBLSK5yjniWPdGc453bzwnN7Px7BOEvB6NmgMnMhs9ndfzrgZUFpuNzCrAU0if/P4tFxzokNjwt05Jrx3qktwKOJyWMv5YRsrcQBwvwdH0lOEqL/53a7O616AsS7nqOtZrs8XXAn2glB9A/OBS8XokLbmrzgcA5Qcq7+8dEp/H/6KcElh9AGAfiJ8x7+42xYHVB/z8c/x3pAXyXYpz1rxjjXl3h1l59vO7NzUh8VCXlF7HMxr8nJvR4PiJrg1EMPj6nqvE0W6NxPHujURuj0YiL7OxFid6NNrhH/DxQC/mZiVdEf8ndL7ovI+mJQ+EYIn4vECC6ZygNAl1Tv2NNGveQBxLT1mKDj+nY9J7CCC4Zsm1WfjxMasflBL/wU7JXxNf03IzUjbruAzXDyh9J0F2BpZOQF2b/SA2xry726z8Kx/g+O9ss3KudMead74x7+6wQJ7lIP1Il+TM410bbKOBnFfHVf4PL4iC4W8KT1ZniaLVPwrvhgkSnglf+fMd27ZU5O1cITy7V4uiPWtE4bKBEp7pbUXBuE+1gzxADfJoQHgL1YktwhZI+v/DLCw62CPpKT9CiFayFfJ63VtM+uRmomBWJ1Ewt4fwrBsn8teM8efBMc4VrhsvitYTlg+WDlI4s73837zvHitVpgIFkwO4Nuqw7Ovb/qHqVVJHVV+2yFqgH0jxIwAXB/hTf8gBVvHDDzwrh1foBypQQPT4X2t5VqgOYFfr+rehPiX1Qv2UH7BV3ph3d1sg/xz/nW+BnLPm3WHMu3usFM+I6b91TvyA2vuXQA7Ar2daKxq4DRfebXOF+G1LufBkdfL/7+HDh8WJEydEYWGh8Hq9Qme+3IOiaNdyUbjkO1Ew6kPNAK/RphPdG3+R1/Ouq1BxtvBNka6IP21/+8T70ZlaCQfyvn2QyPhIFM7PlCN1cWBDKZK9BzaJov0bRcGeDeLE7rUn/5eOcQ5pyGP9Hyu8m6aIwqX95QyArqM/mpYyHTPFfV+57q8ldWXRR85OFT+1NQX5pYE8VCT+yviBb/dyUbR2NP3gSxX5g18pdV3geHrKFvqR903Ali3lA+wHoRvz7m5T/Csf4PjvfGPNu9OYd3eYaifF9Wm/tKhXi+LnRBqwF6l2xoScZ3JTUbRqmPBlrxLi180hwUMDe1XWb7/9Jo4dOyY8Ho8c1Pl8vpKhXDlWVFA8yFvQU+QPeCpggNd4dl73Ri9R3dlCsFICx0zo4bTkjpgdVUQBshNf+K3wbp2jJVbBRwL2kpA9JOjcnWvEkW0r/GXgGOeQhjzIqysjEL7tC2lU318UjP1UnOjeyF8eZpKwBQiOirqX3IMSPVvwVob4kwdSYM1X7R2K+CPuB/vXi6I1o4Rnaiv5o1KVBWB2D50S6l1Sfw78wRnzzmbln+O/803pgzXvLmPe3WWluN6bmtDoWHqD5dY2LRjxroyraHctH0HCOqjbt2+fOHLkiMjPzxdFRUXBDeoCDAM8rP7l9b7/5OCuR6MdPLir2Kyk/+mnb+pUgcBzLQLPH/C0KJzfQ/h2LdOSqQPEW7TvJ5GfvU4c/WWlyNm8xE84jnEOacgTlNADgEAjO/hhb/jLBTB7C8elewkUPVv5dor40ZbWtg1H/NH2Axn8J3xZ6kceBf6dBzokvo77KLkfDvxlG/PubrPyz/HfHcaad6cx7+6xUlzv75D4xLGMBj+r9svrdQ8NwjoK3/YF1MbgpPJAear83bt3i0OHDom8vLywB3V+wwrepmlytfjk6l2j/bmZjT8S/VP+jJtlKzYr6X/CbE3gFhsIybt5hpbAiuA7sFEU7t0g8navEYe3LhMHNizwl4tjnEMa8iCvroxgAccsnNlOOqq6xrH0lHncuQdlp4rfsv2isuKPmR/sX0edUb9S27SwyvBHp6RPArZnsQ8UG/PubrPyz/HfHcaad6cx7+4xK9d/WtesTjUauC9U7YWVT8/sNOHbvVIIcBFBWAd1u3btEgcPHozMoM5iRVtni4If3z65cpfZaNPx7o3vxo272UC6Iv5Po96qduHhtOQ+igzMhngmNxG+X+ZriQsW3n0bROGe9SJ3xypxcMsSsW/tXD/hOMY5pCEP8urKCBVwVDiWtXPHTBRmn3GvJffsdtEr04nfP2sXKfHHww+Klg0U+T88778O9uTvalv/QbpP/oHHvLtd+7h/5QMc/91hrHl3GvPuLlN8/ynjuWv+ltMxqf3xkmfmwHXhvO6CCNG2ZyRgHdTt3LkzKoM6ZUXbF5Ya3OVlNhpzvPu9F8tWcJlZRX4alq9zMxr8Kono3lB4prYUvp1LtISFCojXk71OivmPzYvFntWz/YTjGOeQhjyRErof5LhwYNW5YyvRH52TWsPRS+7dzYEeVkr8v3dMapPbtYHcbhVp8cfTD4pWDi0V+KlDGz//85pX4L5L7h/t4CY/YN7dybsyxT/Hf/fwz5p3p+aZd/fwrriWcR2D22PpKXtUm8i4vnsFtddPUYVnVgc/Dzt27BB//PFH1AZ1ygrXjhZ5fR/xFQ/s7jqMt2WiQdxgyrFB/GmYsbEuvxeMeEd4t2ZpiQoX3n3rScRrScwrSdSLSNxZfsJxjHNIQx7k1ZVRWcCRMeusrnssI2WXy2dzThE/ZrhU+0RD/Hbwg8J53cSJnvf45HUzUg7/1iGpCd3/6SXt4AYfYN7dybsy3KfyAY7/7oj/rHmO9cy7e3SOQezpB7skdVJtnz/45eK3Eu+ngXQM4JkZ+0EdDJ9GwPfv1KpdfmajKYfSUs5B4zjVrCI/fV/7xDfUQ/CYsSlaOVhLUGXh3btOeHavEbnbV4icjQtE9qpZfsJxjHNIQx7k1ZURKcCx8weenM2B45fM2lpnc5xucRG/XfzAt2ORKBj7sf/a2IYy5NWbLyppDw76EQbzbhtT/HP8L7m+C+I/a55jPfPufN4V36fN+rjGlUfTG6yW945dF1ldtG0UTcRrUKcMb8s8+SkEvEilYV3ZSg4zv8jh3IfTkkeoRvdMaSHE3tVaciIBuwjdCjh6bveGcjaHBL9s2ae3XUdto2ZtnRroYaXFT/eONqC2iLr47eYHRat/lD9m5f1npBz4uUXdFLQLwYkzesx7CVzGuzLFP8d/gkviP2u+BBzrmXeH8q64xv2ctr11/YeOZzTIxf3m93+qZPC+PubwzGzv5z0egzoYVu3wYXu1aue07ZggXpIOp1ZL8Hk975EfkNSREkl4964lEa8mMS8nUc8ncc+0CH2mPIc05EFeXRnRgJy1JceXdclIObyrbf2nqI2cukx/ivhxz7j3WInfjn7g27FQFAx73V+PA+0Tm1L7OMkHmHcNXMC71XAvkn+O/yfh4PjPmteAYz3z7jDerXyfnp2a8Ka6x4IxHxd/dgZbXOMAOwzqlBUuG3hyYJfZuD8azmQrRTpErrbb5A9+SeADrjpCIg3vHhL6LhL6LyT0n0joKy1Cp2OcQxryIK+ujGgBju8Z/7m/Pr92SPwMbVXSZk4I9DBbiN/OfmANQoc6Jw+idjqDYPpWDea9AjiUd2Wl+Of4fyocGP9Z8xWAY330wLzHzBTfqP8ZGKiqeyucn0n3uy6usNOgDoYJhJMvUWk0xtRv2p0icvXGo8LpbbRERAvePWtIxKtIzMtI1PNI3DP8hOMY55CGPMirKyPagBBUnX7rkNiW2swpP+5sI367+4F37Sj/A9aHuyRPaPbQlXjAFls1OOhXAsx7XEzxz/E/CDgk/rPmgwTH+uiAeY+JWfn+c07npM6yjbs3FIWLvqX7xGA5vvDMTPXzbodBHcz7+zb/c3YmvkCllMj3tkv4UDWwJ6uzloRowrtnNYl4JYl5KYl6Lol7ukXo0+U5pCEP8urKiAWKVg3zP2dRMpOD0bxpHbvVtOLH3vp4iN8EP/BunOzfg38kLXlG/xdvxPdOHBH0mfey4RDelVn55/gfJAyP/6z5EMGxPvJg3qNupfhGnJLtS3wXrRwmBLa02gCeGfYb1MF8Rw+I/B9eUNsxV5sysCtFOmYdVeNKkWsIiDa82SVC30ZC30BCX2EROh3jHNKk0CmvroxYwTqTY+nYTfxxZzvxm+IHvp9ni7zvHpX1Opqeso6DfuXAvMfUSvHP8T80GBr/WfNhgmN9ZMG8R9VK8f17p6QuqD+ejfb+NInua41tYNdBHUy+QKXkY+VYsbP7VsxSpGe3TfhINqwU+VBt48cC3uxVJOIVJOYlJUKfZhH6tBKhL5F5kFdXRiwBgaiO/Y9OSYPRlgSTftzZUvwm+YHvl3kif+Bzsm6HuyTP/E/jy8+ltuSgHwaY95hZKf45/ocHw+I/a76S4FgfOTDvUbNSfO9LTWwm25Viu3fdWCGw6mkjeGa08/Nut0EdzJd/zLJi12gMGtiOVor0Ha3qvawatWjZQG3Dxwre3SuFZ+dykbt1schZP0dkL5/qJxzHOIc05EFeXRmxhnfDRH/HfqB9Yju0KcGEH3e2Fb9pfoBv3ajZvEOdkydSe55J4KAfIpj3mFgp/jn+Vw6GxH/WfITAsT4yYN6jYqX43tGm/tuK76KVQ+g+aHBsM9h9UAfDVsy8/k/Kl6fkZzbuiYa2k1lJP2NLi7qPHM9oUIAGLVzYS9vosYR39woS8TIS8yIS9WwS9xSL0KfIc0hDHuTVlREPeNeN8T9jsTc1Ad+4QMeONrZjoIdpxY/99XYQv4l+4NsyU5zo/YD0gd87JfWjdv1fghFBn3kPH4bwrszKP8f/CMHm8Z81H2FwrK88mPeIWym+f25Z91nVnjK2Y7XThvBMt/+gDoaXp6i3YuZmNv4IDW4XA+l4y9kZa76ufYd6bTUaVtfgsYZ3Fwl9Bwn9ZxL6OhL6MovQ6RjnkIY8yKsrI14oWjFE5HYr7tgx+01tbNeBne3Fb6ofeNdP8M/a2/3HHfMeOdicd6uhPhz/owCbxn/WfJTAsb5yYN4jbri+jO1T3ql+0/H0Bsck33O7Ub1X2hae6W39vNt5UAcr2rVcnOh1n+9EZuP83MyGdWWrx9ngcPK11Z0fr3LZ0fSU3ZL0aS21jR0PeKnRPDuWkpgXkqizSNyTLUKfLM8hDXmQV1dGPIGAiboepx9LWR/fWpPaGq+7RptDcHaxUuKnH3ZHpB/YSPwm+0HRisHyxx1eC7/yy1p3Ujtbg348jXmPImzMuzKO/1GGDeM/az6K4FgfPpj3iJo/tr+Rcsn5R9KSV6IdC0a8R/XFgNi+MGlQBytcO1o+X3eiR6Md8X4jpp90wlkHOyVNkqQPfVXb0PGCFx943bGExLyARD1LI/RZMg15kFdXRrzhmdxU1vdYWsrPEFhJm6Pt4zmLoyxQ/MulH9hM/Kb7QeHsLrKu+OGc+sg1l1N7qx938fIB5j0GsCHvyvz8Ezj+RxE2iv+s+RiAY314YN4jZrgeBpPYBnrmrx0Se6JeeX0fkS94EbtpQGxjeKa38fNuwqAO5pn4VdxfnFKK9Oy2CS0k6b0fEL6tWdqGjhe8O5cKz/bFInfLfJGzdqbIXjrppNDpGOeQhjzIqysj7ti5WOQPelHWOadj0hBq87NK2h4cxCvQw4wRvxP8oGD4m7K++AFN7Q0fiOePO+Y9RrAR78pK8c/xP8qwR/xnzccQHOtDB/MeEVN8Y5Xwf9c3qfOYbMPuDYV3zUhtne0GEwd1+NSB+jh5PJ6vs5L+53VNat+nGtC7api2keMJJwgd8G2eLk70vFvuu97aqt671PbxfqDWKPE7wQ/wgxk/nFHnXW3qf0XtHo+3ZTHvMYZNeFdm5Z/jf4wQ5/jPmo8xONaHDuY9IoZrYBB5xvP1LrrweFrKb6hL4ezOVL9lRsDEQR3Mu3dtyTbMxnl5Pe+6SrIRI/OT/nLixRdgSwgaDw2pa+B4w7tzCYl4EYl5Hol6Bol7okXoE+U5pCEP8urKsAuKlvaX9cZ+9n4v3VCFOMC+a3ABwcfaSos/PeVX1M2u4neKH3hXDZV1xjM2Y16vWpXaP9Z775n3OMAGvCvj+B8nxDH+s+bjAI71oYF5r7SBb1wDq4Nn7WufkIF65A/6N9ULg2Az4Jne2s+7SYM6WOGCnnJghw+Tg5BYmCIdMwdn7WmX0F6SPvBZIXYu1DZwvOHduZhEvJDEPJdEPZ3EPcEi9AnyHNKQB3l1ZdgJBaM/lHX/vVPSaOLgL4R4bMswTvxO8gPPpG9kvQ92Tp5F7f/XEh5i4QPMexwRR96VKf45/scJcYj/rPk4gmN98GDeK23gW67KzvqwRvLx9AYe1AGfVxG7qF6GwDPN3EEdPkyuvl93IrPR05KVKJuf9BGv3lwtN7349dWYWdA1rh3g3UFC/4WEvpmEvoaEvsQidDrGOaQhD/LqyrATfD/PlNsfUP/VX9d+griIx7aM0uIv+S6VncXvJD/wbZsjTvS+X27F2tys7mvEQ6x8gHmPI+LIuzI//xz/44M4xH/WfBzBsT54MO+VMpSJQSNezvK3Q12SF+LaGFyKXUuMgsmDOljRpmnqpSn7Rf8UrNJGzayk/xUzCJL0sR9rG9Yu8O5YRCJeQGKeQ6KeRuIebxH6eHkOaciDvLoy7IbCrE6y/kfTkrc+XefCi4gPtQ0nmkFemZHid5ofFM7vIeuOLTEBPoCgHw1j3m2AOPCujOO/TRDD+M+atwE41gcH5j1sA98oE4PGs9Y3rf0Crotn+8T2+fJFTSbBM62Vn3cTB3WwglEfFg/sejRKA0HRMCvpZ1pJ922Zrm1Yu8C7faHwbJsvcjfNFjmrp4rsxeNOCp2OcQ5pyIO8ujLsiPzvn5H3sL1VvW+IE/WWJHAU6Y7dasaK34l+kP/Dv2X996Ym9CY+orkVi3m3EWLIuzIr/xz/bYAYxH/WvI3Asb5iMO9hG8pCmRg0nnM4LXkDrlk4J43qQINfw+CEQZ33923+l6Yc737vxSAp0mYl/Ww/6VkdtY1qJ3i3LyARzyMxZ5Gop5C4x1qEPlaeQxryIK+uDDuiaElfeQ/H0lJ+e6LWBSAdb0PDdgkE5GiZseJ3oh94146S9ccD1ZnPXXcdcRItH2DebYQY8q6M47/NEIP4z5q3ETjWVwzmPSwD3ygLg8W/rPmm9r9xveJB/DxtnewOJwzqYJ4pzaO2WqdIlzM3ppHuRKErqNnabS3rNSFuov0wrdHid6ofFPz4jryHPe0SviVe/kbAlplI+gDzbkPEgHdlin+O/zZDFOM/a96G4FhfPpj3sAx8Y5BYehA/q4MQOxYaCc/Uln7eTR7URXO1zmjSvb/MF56tc0XuxlkiZ9VkEvcYi9DHyHNIQx7k1ZVhVxQt7iPvI0ardewHNgS+F4R7wExe2lNVbiBurA9UR8KYdxsiBrwrY/5tiijGf+bchuBYXz6Y95Ct1CB+1de1XsR18nrfL8Qvc+jaNPA1EE4Z1MGisVqnJR1v38JbuHQNajd4f5lHIp5DYp5Jop5E4h5tEfpoeQ5pyIO8ujLsjBit1hkvfif7QcGPb8v7iMJMHvNuY0SRd2Va/jn+2wdRiP+seRuDY33ZYN5DNvwvypCD+JxOSbNxjcKZ7YV8ftJQeKa28PNu+qDOe2Bj8aAugm/C1JLumfiVtjHtCO+2ucLz82yR+9MMkbNyosheZBE6HeMc0pAHeXVl2BlFi76V93IkLTmbODqXEI3VOuPF72Q/8K4cIu8DM/YP1jjvUuIIM3mR8AHm3caIIu/KOP7bHFGI/6x5G4Njfdlg3kMy8I3/ldvq2zxy9c3ysxWYsNs0RVsHU+CkQR0sf+ircmB3vHvju0FcZexU0tOLv0vk2zBB25h2hJOFroDZNNzP/E9ufYS4UrO14A4cVtZ0fmCc+J3uB/n9nlA+8CzxhJm8SM3YM+82RhR4V6bjn+O/DRHB+M+aNwAc6/Vg3kMy/I9/EL+5ed1mKLtg+NtCYBXTYHimOGtQV7hsYMkWzMZDQVxlzEr62Rua1PlCkj74ZW1D2hXerXOEZ0uWyN0wvVjoC4vfJgTgWAqd0pAHeXVl2B2Fk5vI+9mTmvADcfX3Es4i8cMO5gjxO90PVCDb1z5xPPFknbEP1weYdwMQBd6VWfnn+G9jRDD+s+YNAMd6PZj3kEwN4rHid/4fnZNWoeyiRb211zYJThvU+Y4ekIM6vDDlUFrKOSAvXAPpcJhSpBfOzdA2pF3hdKED3lXD5f0cT085cnfVcy8nvvDdIgg2nNnaQHOE+J3uB771xR9axWrKm8mXVSGu8E2byvgA824AosC7Mvw/x38DEMH4z5o3ABzr9WDegzbkxSAeK31/7ffSDUkoVz4/+fMsIbCKaTDwchHFuxMGdTD1MfLcHg3fAoHhGEiHo0jSezx5bS3ZSHI5fpq2Ie0K78+zhWfzLJG7fprIWTFBZC8ofpMQgGOcQxryIK+uDBOQ3+9xeU8rvrjtHeLsbEIkH6Q1Xvxu8IP8gc/L+1n3Te0viS/M6FR2xp55NwAR5F0Z/o/jv0GIQPxnzRsEjvWngnkP2hTn+N+/b21ZLw1lesZ9Qtegwa7hcOKgrnDDhOItmJmNxoDAcKwU6Zua1WmOBioY+Z62Ee0M789ZJOKZJOapJOrxJO4RFqGPkOeQhjzIqyvDBChHLlmaP4+AWTfMtOPHWbjmGPG7wQ8KZ3WS93OgfeI04qsyPsC8G4QI8q6M479hiED8Z80bBI71p4J5D9qQFyt8WNG/4PdOSUtQZtHCXtprmgYnDurUFkzCIRAYjpUifX/7xOlooMI56dpGtDPcIHTAu2qYvCdswSHOLiJEYhuWY8TvBj/wrSv+2GqJD+C7VeG+NIF5NwgR5F1ZKf45/tsfEYj/rHmDwLH+VDDvQfGOPMiL//lbynVnX3UML8WhMn0bpwixdbbx8Exu5ufdKYM6WP4PL8iB3fHujW4BkaGYlfS/gnRyoJNvPdM0op3h3UJC3zRD5K4joS8fJ7Ln/3hS6HSMc0hDHuTVlWEK8nreLe9r6Cs3NSbuKrsF8xTx+/3AQPG7xQ/y+jws72nwSzfdRbxhe0Y427CYd8MQAd6VWfnn+G8QKhH/WfMGgmN9aTDvQfGOPMgrV2anvF/9SZRVMPgl7bVMhFMHdZ6sTnJQl5vZ+CMQGYpZST9HkZ4/4GltA9odbhE6gO1RuK/1TWq3JO6wNF+ZbxY5Svxu8QPPqI/kPa37pnYr4q3S27CYdzMQAd6Vcfw3FJWI/6x5A8GxvjSY96B4Rx7kxf+cv7l53QyUhYGQ2Io2MR9OHdQVbZpWsgUz9OfqrKSft6VF3XRJ+vjPtQ1od3i3zCIRTycxTyFRjyVxF78pDMAxziENeZBXV4YpKJzTRd7XvtSEGcTdhQRsqVBbcEI1R4nfLX6g8QHrNqxgjHk3EBHgXZmVf47/BqES8Z81byA41pcG8x4U78iDvPifiw90SJyHsrxL+hW/GMcB8Exu6ufdSYO6yjxXZyX9ItNJ926eKTwbp4nctZNFzrIxInte8bMHAI5xDmnIg7y6MkyBb23xK3yPpaccJe4uJagPVIJTzMqFYo4Sv1v8IAI+wLwbiAhq38o/x3+DUAkfYM0bCI71pcG8V8g70rAyi+2a+J/LjqQl/46yfOvHUtloE/Ph1EEdLH/AU3Jgd7z7vXieMihTpMNBHEG6d/MMEvFUEvMkEvVoEvdQi9CHynNIQx7k1ZVhEvAqYtzbx42vqEn8VfaVt44Rv5v8IMAHQvkYMfOuKcMUVIJ3ZYp/jv+GIoz4z5rXlGEKONafBPNeIe+Kc+T9+5O3XXQzysCzuLprmAonD+oKxn0qB3W5mQ3rgtBgzHGku0noQP7A5+S9jXun6jPEoXW/dUVB3mrsB5oyTEHB4BflfQ199aZHib9QfIB515RhCirBuzLmX1OGSQgj/jPnmjJMAcf6k2DeK+QdaciDvOcNfuWmx1AGYobYQu3hEHgmNfHz7rRBXeHcrsWDuhA+Ql6KdDiM6aR7N00Xnp+miNw1E0XO0lEie+6Qk0KnY5xDGvIgr64Mk+AZ+195b8s+v60pcRjKcxVWc5z43eQHlfAB5l1ThimIgPY5/mvKMAlh+ABrXlOGKeBYfxLMe4W8Iw15kPdC/C/K8Iz6gMpEezgDjh7UrR1d/Fxdz0btQGgw5jjSvZumkYgnk5gnkKhHaoQ+UqYhD/LqyjAJhdNby3vb3KLut8Rh4HdMgjX2A00ZpqASPsC8a8owBRHQPvOvKcMkhOEDzLmmDFPAsf4kmPcKeUca8iDvxfhfyfmU5lQm2sMZ8Ez6xs+70wZ1RdsXFg/qQngDpuNI926aSiKeRGIeT6IeQeIebBH6YHkOaciDvLoyTELR/G7y3va2S5hJHF5GwH55JXbMzgVj7AeaMkxBJXyAedeUYQoioH3mX1OGSQjDB5hzTRmmgGP9STDv5fKOc4pz5L10Z+v6Y1BGYVZHITZTuQ6Bkwd1voO75aDuRGbj2cRhheZI0r0bSegbSoS+hIQ+xyJ0OsY5KXTKg7y6MkyCd2Xx7NSBDonLicN/EEJ9WQr7geF+oHzg1w6Jy4i/YH2AeXcn78qYf8P5B0KM/8y5OzXPvLuPd5xDGl6Mg7z/2JeasABlFC3IpDLRHs6Aowd1JZ81ONGj0Q7isEJzJOnejVNIxBNJzONI1D+SuAdZhD5InkMa8iCvrgyT4Ftd/G2WQ12S9xKHVxJCfQse+4HhfhCmDzDv7uRdGfNvOP9AiD7AnLtT88y7+3hXnCMP8l6BiR+U4V3UW4hN1B4OgWfi137e1aDuxIkTorCwUHi9XqMHduEO6kqRnptBQl/YS/g2TjYSRRsmiYJ148XxVWPE74uGid1ZAwXuCcAxziENeZBXV4ZJ8K4cKu+tROz/JODNSP9LwEPRZQV5q7EfGO4HYfoA8+5O3pUx/4bzD4ToA8y5OzXPvLuPd8U58pxLuCqnU9JmOahbNoAGQ5MdA+ugbvv27SInJ0fk5uYKj8cjV+swsDMVGJCe6NFY5HZvnEccVmiBpP/zNyL9eEaKKFzSn0Qw0Uh41k0QeWvHiqMrR4lfFw4RO2cNwEcbJXCMc0hDHuTVlWESvD9NEuDsaFpKAXF4DeF8At5wFcwPOxj7geF+EKYPMO/u5F0Z8284/0CIPsCcu1PzzLv7eMc5pCEPBoBXY0CIgY+PBoiCBopOgXVQ9+uULuLQrO7i+Lze4sSCPiJvYV+Rv+g7o3G8e0OR26ORKOG0LI1Ls5IOB7mGRvKSdIZ5QCAjDq8l4HW3SuzYR1+RsR84BCH6APPuEISpfebfQQjSB5hzh4BjvTsRAu84Z+X8Xwc7J+/TlcmwP452k4M6TMyAV+hZa4p0+YpbwrX72yfu1xXIsD8OpyWD9OsJeN3tXwh4fXFZQd5q7AcOQYg+wLw7BGFqn/l3EIL0AebcIeBY706EwLviHIO6CwjX8KDOXBzMaAjewTUGdkEN6uAgN+xpl7D/QIdE8cfsb8XvC4eIXxcMEgfmm4V9c38Q2bMHiB0zvhObJvYSq0d3FTvb1JfAMc4hDXmQV1eGCQA34OjgkmF485nI6ZQE0m8iXEII9ocdjP3AUD+opA8w7+7kXRnzbyj/QJg+wJy7U/PMu/t4t3KOQV2V3zsmbcEAwbt8oBA/TXQU1OBHl2Yy1H0d6HwHeMf2acW3dmCnSMd3S+AgN//Sqt7WvakJYt+0bmJP1vdi96wBYtfM/hI7Z/QzAtunfSe2Te1TLPJR3cTioZ3F5uZ1JXCMc0hDHuTVlWFnKD7ADTg6MG+QAGf72ydir3VVAr5hAk6D+WEHYz8wzA/K8oFfO8qAH6wPMO/u5F0Z828Y/0BZPhBk/GfO3al55t19vOMc0vyDun2pCSvloG5hJg0YJjgKJwd1+nQT4Vs7Ut7T8YwGYmdqymHiEHzjDbZlrtYp0v1C39iszprsdgliz/h25FD9xI7p35EY+kr8Mq2PEdg65VuxZVIvsWF8D7FyRLpYOLiD+KlZHQkc4xzSkAd5dWXYGYoPcAOO9k7tIcDZzjb19xOH1Qih/LCDsR8Y5gen+MCsPtIHstsmHCf+gvUB5t2dvCtj/g3jHzjFB0KL/8y5OzXPvLuPd8W5f1C3s3X9OTyoMwe+FcXfXTySniI2tkzMJg7x5lqs1mGCJrhB3dpvas+XszcTUsWerAFi9yzMFmDWALMHmOmwPyCEbVO/FZsm9hSrR3UVi4d2sszedJLnkIY8yKsrw85QfIAbcLR/eqacwdkVwUEd+4G9EaQP4COz5fkA8+5O3pUx/4bxDwTpA2XFf+bcnZpn3t3HO87hx79/ULe1Rd0JGCQUzmxHg4bxjsLJQZ0+3UT4VhR/d/FwWopY1zwBgzq88Ea9HKfc7ZfYl4t91jeu/rLWZOzb/W1MU/H7gkHi1/k/iAPzBhqFfXO+F9lZ/cWOGX3FpgmZJOz0k/us6RjnkIY8yKsrwwSAG3CUM7Wj3Gu9tWXd1cQh9lpfWsJpeUHeauwHhvqB8oE/snpLH8BzEsTfzYRgfIB5dyfvyph/Q/kHlA+EGP+Zc3dqnnl3H++Kc/+LUtY3qTNEDuqmNBNiwzhHwT+o06SZCu/CXvKefu+ULFZ8XQ/xHTxikF6m1hXpyHQR4boVX9Ya9kfnZHF4zFfi6NJh4siSocbh0KIhImfhIHFg7vdix7Q+JOweUgwAjnEOaciDvLoyTIHkaFpHAc62taq3hDi8gYCgXVGQtxr7gcF+AH6OzsqQPkCd2QbiDz6A2dhgO3rm3UBUgndlzL/B/AOSo9DiP3PuTs0z7+7jXXHu/6TBzA9rtMMgwTPqA+0gwmQ4cVBXOK2VvKfd7RLF3E/qDCEO8eZaaLhMrVtJl8uz0967JfVIWoo4PvxdUbB6lMhfNdKPvJUjjEDu8h9JBMPFH4sGi71Z/cW2Kb3FQRIDgGOcQxryIK+uDDvDygk4yp3wjQBnq76qPYw4vI6AoF0u8QHGfmCYH1j5kD4wqbn0gfVN64wm/vC642B8gHl3J+/KmH/D+AesnEgfCC3+M+fu1Dzz7j7esT0PnOMZLHx8/J99nr/+DQwSCga/JMT6sY6Cf1CnSTMVheM+lff0c8sEMfH9WzsRh9AuOAevWq0Hkn517+euexNfrc8b+JwoWjvaSHhIABDF0aVDxa9zvxc7p/eRH2wEcIxzSEMe5NWVYRLyR38kwNnc/97ahTisQgDxCN5lEh9gZfvBoBe11zQBbvKDgrGfSB9Y8EnNHsQfPkyqxF9eR8+8u5N3ZRz/DecfCDH+s+bdqXnm3X28g3O8JRGcn0u46snbLmyIQUJer3tp0DDGUTg5qNOnm4iCIa/Ke9rQvL74/rVqbxGHFT5TpyU9N4Map+e9wrdutJEoWjNKFKwaIY4vGyp+n/e92D2jj8A9ATjGOaQhD/LqyjAJ+RSUcW/fv3jj+8ThvwgVEh9g7AeG+0H+4FflfQ1//aZPiD/4gPWHXVk+wLy7k3dlzL/h/AMhxn/m3J2aZ97dx7vi/M8EvDXxCkL1o2nJxzBQ8K0eph1ImAonDury+z4i72nlN/VEs/uqNCT+MCEDDZepdS3px9JTCkwm3bsWMzgjRe7yYSJn/kCRPbOvn3Ac4xzSkAd5dWWYBEX8W4mX3k/8/ZNQIfEB5kjxu8kPlA980viKx4i7YH2AeXcn78q0/HP8Nwshxn/WvDs1z7y7j3fF+RmEswmXE6oe6JC4FeV4F/YWggaLToHiXZdmJNaMkPeDb9Qt+qIuvkF6JQHahYbBq1br5ZO+IFN/MZvDu2aU8KwaIXKXDRU5874X2TP6+AnHMc4hDXmQV1eGMSghHj/EiLtbCEERH2COFL9r/CB8H2De3cm7svL55/hvf4TuA6x5d2qeeXcf7ziHbZmnE/DpA7wt88bNzetOQlmFk5tQ2WgTZ0DxrkszEd55XeX9HOiYJLI+qb2cuPsH4RxCuVovl3TP+M+0F7M7vGtGkoh/JDEPIVEPIHF/6yccxziHNORBXl0ZpkARn90uAa87rUpQxCN4lxfkreZI8bvFDwJ8AN+vCUr8ZMy7O3lXVi7/HP/tjzDiP2venZpn3t3JOzjHM3f4PiHeinv9uHeqtUZZBUNeEWIttYlDoHjXpZkIz7jP5P1saZkgxr5TA89Rqu8SQsPgtSzOTyV91Os3N5GkD3xOezG7w7t6hPCsHC5ylw4WOXP7i+zpvf2E4xjnkIY8yKsrwxR4Rn8k72vxZzW/I+5uJCBYB0V8gDlO/G7xAyX+RZ/W7Ee84TtVQYufjHnXlGECKsm7slP45/hvDsKM/6x5TRkmgGN9aTDvFfKuOMcLVfA6/Cqv1b/kIZSVl3mX9lqmQvGuSzMR6H9xP6ub1BOdn7z+38QdNAvtKs7LtFNIr3f12XfKBup+pxCrh2svaGe4RehAfr/H5X31eObad4g7vM4axAf7nSqrOU78bvEDJf4SH8CrjoMWPxnzrinDBFSSd2Wn8M/x3xyEGf9Z85oyTADH+tJg3ivkHYM9PHOHF6rgGTw8i1fzj85J+1Ged0FPubXTCVC869KMw6ph1P82FMfTG4j5n9UpuOGiszCQr+htp37TkX7r/vaJ29BARbPa6y9qY3hX/Sg8K4aJ3CWDSNT9RPa04q+yAzjGOaQhD/LqyjABvmXfy3vCPuurL/hzAvF2DSFo4gPMceJ3hR+Q+HO73emrhA8w75oybI/K866M47+mDBNQifjPmteUYXtwrD8FzHuFvINzbM/ENk08gydfkLOxaZ0paCPP+C/oGmgX86F416WZhqKsTvJe9ndIEjP+K5+nu4oAzQb1EjQd6dVWflVrhCR95Lvai9oZ3lXDScRDScw/kKi/I3H3tAi9pzyHNORBXl0ZJqBwWsvieyreZ12DEBLxAeY48bvBD5T4d7etv4b4CscHmHdNGXZHBHhXpuOf478BqET8Z81ryrA7ONafCua9Qt4V53jGFts1sW3zpoEv3fglysRKv1iDdjEfinddmmnwDH9L3svG5vXF8DeqpxNnIT0vr0jHMq4i/cauT1V5D4XKjxRqLmpneFcNIxEPITEPJFH3JXFn+gnHMc4hDXmQV1eGCSgY9G95TxPfqd6ZOLM+JB8U8QHmOPG7wQ+U+Gf/p0Zv4iscH2DeNWXYHRHgXZnin+O/YahE/GfNa8qwOzjWnwrmPSjesZKHFT1sy8a2zWuvOv/PyYc6Jx9Eud753YXAJy0Mh+Jdl2YUVg2Wjz7gXhZ9Xke8nHgFvk93CcG63bYizkuRfhEBX6uvc7CE9KKsjvqL2xTelUOFZ/lgkbv4e5Ezp4/InmoROh3jHNKQB3l1ZdgdvmX9/Pf0QLXz8X2iGwghEx9gWvErPzBN/I73A4i/W7H4X6xzMb5dE64PMO8mIXK8K7Pyz/HfAEQg/rPmTQLHei2Y96B4Rx6s6GHb7fmEqwk1V3xZayTK9Yx6n66FtjEbinddmkkonNpc3seBDkli6ke11hNXVQh4BjakRysCSZfPVSz9/LYhkvThb2ovbld4Vw4hEQ8iMQ8oEXoPP+E4Lhb6AJkHeXVl2B2FE7+S97Ojdf1lxFUtAvZZh0x8gDlK/E73AyX+Pe0SNhJP8IGwxE/GvBuECPKuLJB/jv82RwTiP2veIHCs14N5D4p3DPqwooeVPf8W+88bX/kKys7rea8QK3+gASS1j8FQvOvSTELBwGflfaxtUk/0fenm1sQVttueSwjp0Qor6VjWxfJu1bdTLntekp7Z2CjSvSsGC8+yH0Tuov4iZ/a3IntKdz/hOMY5pCEP8urKsDvy+z0m72fkm1VTiSt8jDIs4gPMUeJ3uh8o8U94u1oX4qkyPsC8G4QI8q7Myj/HfwMQgfjPmjcIHOv1YN6D4h15MPjDyh623WKlD2/QrLevfcIvKL9oRhu6HtrHXCjedWmmwLf05Mfz531WR9x/y8UpxBO2SZ9NwLZpaDcorVtJx7KuIr1udruETZL0aS21lbAjvCsGkYgHlgi9N4m7m7+hcIxzxUIfKPPqyrAz1Ico8TakK88743biSX23JGTiA8xR4neyH1jFf1/V8x4kjirjA8y7IYgw78qs/HP8tzkiFP9Z84aAY33ZYN6D5h2cY2UPK3x4c+a/CDWnvFc9E+VjkkispOsaDNVWujRT4Bn5nryHXW0Txbh3b51DHOFRCDwSge3SamU2WM79pJ9JAOlyWX7q+9V7mEa6dzkJfSkJfSEJPYuEPtkidDrGOaQhD/LqyrAzCga9JO9lY/O6s4mj2gS1JB8W8QHmGPE72Q+U+H9uUXch8QMfqJT4yZh3AxAF3pUp/jn+2xwRjP+seQPAsb5sMO9B8458GASqFVq5G+OK886482CnpEO4TtHMVLou2shMKN51aSbAt4QG8SXPT87/rLZ4786rniKOsDKLN52eScDKLDgP2qyk+7fgEOl3+B+YxwyOpjJ2g3f5DyTi70nM/UjUvUjcxTObAI5xDmnIg7y6MuwK79wM/7182vCK14gj3ZJ8SMQHWNniV35giPid6gdW8X/S8IrXiR/lA2GLn4x5tzmixLsyjv8GIMLxnzVvc3CsLx/Me9AGzpFf7cbAS3KuI9SZ/F71nrhOwaAXhVhBbWQoFO+6NBOgBvE72yaKkW/eMo+4uZFQqV04OtIxM1BbkZ7/3WPaytgN3mUDhWfJAJG74DuRM6sniftkR4hjnEMa8iCvrgy7QhG/pXndRcRNfQLehnQpAVspwt1+ZTXHiN+pfhDgA/gYaaXFT8a82xxR4l2Zjn+O/zZDhOM/a97m4FhfPpj3kAycYzCIQSEGhxgk3vKPc89oTIN5uVrnnZtO10c7mQfFuy7N7vAt7u0fxM/7tLZ4K/nyZ4kb3cuvQuW8TNIb+WdwprfSVspO8C77nkTcn8Tcl0SdSeJO9xOOY5xDGvIgr64MOwLE53a704f7+PjOK94gbmoSsHUCWygqRXyAlSP+4qV6E8TvRD+wir/EB24jRET8ZMy7TRFl3pWVxT/HfxsgSvGfNW9TcKyvGMx7SIb8GAxiUIjBISaDMClUb+nnt43B9Qp+eI7qgHYyD4p3XZrd4Rn5rqz7zjaJ4sfiVTr1PUKspGNFHVoNq2+3ko6ZP0V63UnvVuuFi+b3f0JbKTvBu2wAibgfibkPiboHiTvNTziOcQ5pyIO8ujLsCM+w1+U9lMzeJBICiQ9n9kZnjhC/E/1Aib8cHwhb/GTMu00RZd6VWfnn+G8zRCn+s+ZtCo71FYN5D9kwGMSgEIND9ez0rY1vOvexQ12SD+O68qVYy6mtDIPiXZdmZ3jndPHXfe4ntcRrSZc/R5zgOWk8P4mVdKyohzt5I81KuvpmUY3iGZzi2drCCV9qK2cXeJf2F57F34nc+d+KnJndRfakk42GY5xDGvIgr64Mu8Gb1VHWPzejQd6Tt14I0tU3SyJGfICVKX41k2d38TvND6zi/88d/3iT+IiGDzDvNkOMeFdm5Z/jv00Q5fjPmrcZONYHB+Y9ZMP/YTCPwSGenb6cgK2d9Ye8elNnXDev5z1CLOtL9UF7mQPVbro0OwMTpaj3xhb1Rf+Xqv5IXGAQj0+NROo9GaVIxwwO9vHKGZxez17XQpHuW5SpraAd4F3aj0Tcl8Tcm0TdTSP0bjINeZBXV4atQALL/+5RWf+sj2oMJi7U7E1EiQ8w48XvND9Q4l/82W1jiYckQjR8gHm3GWLEuzKO/3ZD9OM/a95m4FgfHJj3kA2c4/+tg3ls4b6VcPuO1vXX4/qeEW8T79ReBkHxrkuzKwonfS3rfKhLihj//q0HL/n7n/H8JAbxeM5VDeKhUfAWtulIxwxODUKDzc3rLpakD39DW0k7wLvkO+FZ1EfkzuslcmZ0FdkTO/sJxzHOIQ15kFdXhp1QOO5TWfffOyX9etnfT7+HeMAe64gTH2DGi99JfqDE/0enpEPkA/cSB2oGL9I+wLzbCDHkXZmOf47/cUQM4j9r3kbgWB88mPewDP+PcgIH8/U+aHD5O8fSGxTimT7v7I5UL7SZGVC869LsCN/C7nLSBHVe8kUd0fLha5oRB2oQj622EZ2wtZJuna2t+3iNC144mpbiQUW8We21lY03vEv6koi/JTH3JFFnkLg7+QnHMc4hDXmQV1eGXeCbn+F/aLbz41W+IQ4wkr+ZEBXiA6wC8ad4crvd4bOr+J3iBxD/icy75QsS+r9wQyq1v3WmPho+wLzbAHHgXRnHf5sghvGfNW8DcKwPDcx7WAbOUY524m7+J7eOQD3y+zwoxJLeQiyldjMAinddmh1R8MMLsr57UhPF0Deqr6G2x4uvMIi3brWFNsFXpS2QdPVsBb6VkTLlveoDUJm83veTM2ZqKxxPeBf3EZ6FvUXu3EyRMz1dZE8ofh4BwDHOIQ15kFdXhi1Agsrv97is9/qmdfBGnNsJIF69CSkaM/VWM1r8TvEDJX7MnFK730GIqvjJmHcbIA68Kwvkn+N/PBDb+M+atwE41ocG5j1sQzkoT03c4UU51xPqXHbO6fftalv/Z9THM/QVqh/azf5QvOvS7IbCcR/Luh7qkiwmvl/jcOI159xPbX8TQb0QJyoTtop09Sa0Swj4lgm+bN9QLc3DGXWVjie8i78lEfciMfcgUaeRuDv4CccxziENeZBXV4Yd4PnxLVlnbLupdtlfHqV2r0fALBpm0zCrBkFGY6beauWLv039LaijHcXvBD9Q4seWjDuu//vT1O7wgaiLn4x5jyPiyLsyjv9xRhziP2s+juBYHzqY97ANnKM8DObVZy2uJFQjJD5a/YKXjqSlnEC9Cid+QQN6ajubQ/GuS7MTvDPb+ndfzPmklnj3jqs+pDbHhCkmUzCp8hcCBvHgBzxF1Kyk40FNLAVjSTjh9uv//gycEBXzjHpfW/l4wbuot/As6Cly53QXOdNI6OPb+wnHMc4hDXmQV1dGvFE0pamsL9529nnjKz+mNk8mgHjMmIN4zKqBm6gQb7GKxd8lORd1tZv4TfcDiB9bX1DfVg9e/QW1dwohVuJn3uOEOPNuNSv/HP9jiDjFf9Z8nMCxPjww75UylKcm7rAaiGf3sAsAq4S3d3v62jayLfF83ZyOVF+0n32heNel2QW+Bd1EXu/7ZD3XNKkr0p+64Xtqa0yUYsIUE6eYVMHkCniJNN/SFOlwKpCOLR/qQdoG6Gyw5xoV9M5opb2JeMC7qBeJOJPE3I1E3YXEnWoReqo8hzTkQV5dGfGEb24XcaJHIyn0sW9V7UttfScBD81eSwDxmDmHEKNGfIAZKX6T/cAq/hkf3jKU2hk+EFPxkzHvMYZNeFem+Of4H0PEOf6z5mMMjvXhg3mvtGGwiFVArAZiVdD//DSh0cJPa45H/VBP35zOQiymNrQpFO+6NFtgUQ+R3++xYt9MTRQDX6u2ltq4PkE9I42JU0yqRHqy7hRTpMO5sOUDpGNpHs7XEJ2ObEzqhLyz2ulvJsbwLuwpPPN7iNzZXUXO1M4ie1w7P+E4xjmkIQ/y6sqIF3wLuvqFvvqrWrOojRsTrMvxMSM+wIwTv7F+YBF/yR77uwhxET8Z8x4r2It3ZYp/jv8xgE3iP2s+VuBYXykw75U2lIvycR31/PRVBLkj49JzTn/w5xZ116Ce+d8+KOOTWIx2tB8U77o0O6Dg+2dk/XI6J4uRb9/ya5WLz8QbTtWqbCzekeG3QNKxNA+ng/PBCe9C54PK5vW8m8TeSXtDsYR3YSaJuDuJOYNE3YnE3dZPOI5xDmnIg7y6MuIBCCa/78Oynttb19twyTmnP0Tti7cgVSeobTdqOT7qxAdYheLf2qLuKtTdLuI31Q+U+H/rmPRb1cv+8gS1r9p6FXPxkzHvMYLNeFcWyD/H/yjBRvGfNR8jcKyvHJj3iBjKx3XUKi1ezoIdGXhZTvIlZ5/+sHpxCuKTWNiNBqXUljaD4l2XFm94hrwk64YB3bi3a+Tcfv35z1Db4tM0aveFWpXFpAo0GHVTpMPJQDqcDs4HJ8QHEu/Z2LTOUlRazuLM7aK9sVjBu6CH8MzrJnKz0kXOlI4ie6xF6HSMc0hDHuTVlRFzkFAKvn9a1nFPasKOmy8960lq1wYEbHXCW5CwHQLbbtRyfEyID7CKxV/yULUdxG+iHyjxI9g/XO38V6hd8ca7uIqfjHmPMmzKuzKO/9GG/eI/az7K4FhfeTDvETFwjuvgergudmTgZTmoD+p1+02XnvXUnnaJu1BvxKl4866D4l2XFk94Rr5bUrfbxZQPauY9cdslb1CbYqcLVsHx0iusisd6B440K+lwOnQy6Gzk8xUk9kd+blF3NSoPseP7OrobjAWME7qlQ4fQk6uc829qU7zWFs9RYH81tkFAaNgWEXPiLRac+OlHCe4l3uI3zQ/84s9IOfx28mV4I5LaYx9v8TPvUYSNebealX+O/5GEPeM/az6K4FgfGTDvETPFO66L66MeqA/qhfrdibhE8SkH9Zcxfl46cU9tahMo3nVp8YJn6Kv+es38T83CV5Iu/4TaUm2nx44X7HzBqnisVmVLmZV0dC4QOzobdDpS7BefffqjSuxyxjarg/ZGow3v/O7CM7eryJ2VJnImdxDZY9r4GxbHOIc05EFeXRmxAoRh7dAfqnr+a9SWDQl1CHh9tXqOAsTHWug6C1b8v+Ge4il+k/xAiR9vu2t+/z+/pnZsRLCN+MmY9yjAAN6VWfnn+B8h2Dz+s+ajAI71kQPzHlHD9XBdXB/1QH1QL9QPz1U2RHza2y4hW/L+7QMU49vTvaFd4w/Fuy4t5liQIQoGPltSp9vFjP/UzC8Z0CUQsJ0Z25qxnR6r4VgVj1vfHih2dDbodPxiv+nSs57G8wC4GTxj4Z3RWn/TUYR3fjcScQaJuQuJuj2Ju7WfcBzjHNKQB3l1ZcQCeP4EARH1QoB8sOr5r1MbokNXQsdrhbGvPV7P0ZVlQYlf/cCLl/iN8AOr+DNSDje7/6pvqP3wcgTbiZ+MeY8UzOJdGa7P8T9CMCT+s+YjBY71EQfzHnGz8o64g3qhfniGGnGp4Y2XnPXMzjYJ23A/eZkU46e3onukto0zFO+6tFgCjx8U9H9C1uVg52Qx8d0aRx+65YJ3qO3AN56PxqML2NasttNjVRz9atysLLFjVhGzi3defPbpj/3UtM4y2cg9GvmKJn+tvflowTuvq/DMSRe5MzuLnEmpInt0Kz/hOMY5pCEP8urKiDZ8s9qLvN73yjohMJJQnqW2UzM3ZQk9rsQHWJDiL37ANh7it7sfWMWPb369mXjZf6jd8BYs24qfjHmvJAzlXRnH/wjAsPjPmq8kONZHB8x7VAzXB++IO4g/eIYavCMuSd4pxj++pUXdtbKtu90hP6Au5lP7xhGKd11arOCd1kpOcKAev3VMEiPfrL4/oYrcTq9eeIXnU/HoQuBzk9BaXE2JHaQrsWNWUc3iYJ/wAyu/rDVbNbRnxLvaRogGvHMzhGd2msid0UnkTGxH4m7pJxzHOIc05EFeXRnRRNHEL8SJ7sXfIcJzKJYOHW+Tg3DwpjMIKVDocSc+wIISv3rWBh/ZjKX47ewHVvHvT03c+0DV8/HwLIK97cVPxryHCcN5V8bxvxIwNP6z5sMEx/rogXmPiuH6qAfqg3ohDoF3xCU/74QHl3x+23TV3p5BLwoxrwvdO9o59lD10KXFAoWj3qcB7p2yDrvbJYr+L1fdePUF//sotRP4xkvFrHzH+/0YWgsUu65jv3/829UGqcYuGPCU8M1ur22QSMI7N51E3IXE3JFE3ZbE3cJPOI5xDmnIg7y6MqICcnjP0Jf9dcGPHgREaic1Q1uNAOHoZm5sQ7zFbC1+u/oBxI/OD/X4pVW9n+hH3XPURtiOYYr4mfcw4ADerYZ6cfwPBWbHf9Z8GOBYr2+XSIF5j5qVxTsG9Fip9U/e9XzmurQjXZLzca8YxHpntKI2QFvHFop3XVo04ZvTUahPVAArv64jWj10DT4mr7bYWgfwsX7hVUhmJV3XsWMrDt7gdX+Te69qiqVn3DCW6IsmfaltnEjBOzeNRNyZxNyBRN2GxN3c3+A4xjmkIQ/y6sqINODo+X0fKq5HRsrhfv++oTu1zQMEBEQERgRIu3bo5Vmo4s9FG8RC/Hbzg0DxT33/lh+pXR4kGCd+MuY9SDiMd2VW/jn+VwCHxH/WfJDgWM+8O5x3a4y/7+laF32wNzVhj7zvbncIz49vCjG3Mw3sqc1jBNXmurRooWjCZ9Sn3SWvi+fnJn9Q49gzdS/7itpExXVM1GGLLfg2YbK2FOnWjh3PWODhebySGd/aufeGi898YXPz4i/TA55B/xa+rFRtQ1UW3jldhCerk8id3p5E3Vpkj2rmJxzHOIc05EFeXRkRAzk2HFzN2mS3S9gJAVCb3EeAICAMBEYIBYJRHbrdf9RZLSTxow3QFmiTaIrfTn5gFT9+4H5z71XNqD2sP+qMEz8Z814BHMq7Miv/HP91cF78Z81XAI71zLuDebdO3llj/D0X/e20J5d8XnOmav/83vfLreZyxTYGUNfVpUUa3hktRcGAJ/3X3NEmQQx46eb1N1/21+epLaxxXU3UGdW3W0lXHTve2IW3ol1PqEnA1/LvJjw89q1qQ46mpXhkY/Ro5Csc/YG20SoD7xzqSLM6kphTSdStSNxN/Y2PY5xDGvIgr66MSAAOnder+GF4IOs/NcbA8akd7iFACBAEXjAAgUAoqkNHW9qe+AALUfwnt2pES/x28INA8eOHbcI1Z+ODo4E/6owUPxnzroELeFdm5Z/jvwUOjv+seQ041jPvgMN5D4zx+KQNvlWKbaVYjXzwozv+8dX+1MTfVXsU/PCc8GHFFgP7KEJdT5cWKWAisnD4a3I1EtfC6tzsj2/L/fCOK7vSvaOPSyHgEz/QA3RhwkSd1hTp1ofn8VY0fNsEH62sQcDSM54deOC+m8572zprm9/3EeGd/JW2EcOBd3Yn4ZnVQeROaydyJrQU2SMtQqdjnEMa8iCvrozKAA5c0N8yim9dfyscne5dLcMnESAE/OiBMCAQCMWEDr08C0f8e1U7RVr88fQDJf7crsUz9Ji56/vC9Zl03w8THCV+Mua9BC7jXZnin+M/wSXxnzVfAo71zLsLeUeMxydt8K3SawjYVorVSGzDxWD2UUzgHUtPKVJ8eAa9QNy3pLYDD5GHuo4urbLwZZEPDX9D5PVo5L/Ohmb1RMZT18+6/O9/fpruF30b+jj0dejzTI3rpUyRjo5dve4aH628hIA9xHhmAHuvbyfcS3ik8+PXdIQQVCMV9HuMOvcvtY0aCryzO5KI21uE3sRPBI5PCr29zKsrIxx4pzaVjquudbhLcu4PL93YF/dKgKPD4eH4EEAVAgSBHz8QCIRiJPEBFpb4/bP3hEiJPx5+oMSPVQh1rcWf1Zxx/cVn4rW22IrhSPGTMe/u5F2Z4p/jf8m1XBD/WfMc65l3gst4VzEe3yrFc4HYTopVSGzDxWotBrN4y+eD9f919murvqy9SLUTgG/2eac0EWIO8RFBqPJ1aeHCN7O18Ax5udRgble7RDHqreq/PFTjgs/oHrHrAn0aVmPRx6Gvu5QAPaAPNDGul7KySMeSM/ZeY8YC23EwU4mZnAcu+ttpT095r/oIdICq0TBzWzT+Y20jBwNvVgfhmZkqcqe2FTnjW4jsEd/4CcExziENeZBXV0YogIMWDHjaf43cjAZ5c/9762Q4NN0jZmfh4NiCBIeH40MAEALaBsSjrdBmxhIfYGGJf8UXteaoNgQqK/5Y+oES/4keDf2BHm+9Kpmhx8yd48VPxrwTXMi7srL45/jv3PjPmidwrGfeCW7jHauN2EaK1Udsw8XgFYNYvN0Tn2fBoB4TeA/fe9N576z6qtYS1W5Aft+HReGo94RvVhtqX3BTOahydWkhYXaqKBr7kfRNa323tqwvRr9VfdMTtS5uQvd0PwHPSmJVGqvTajUWfR10AD2YHNdPMdyAIh0zE5ihwEwFtuNghhIPjKpZWwjhoesvPvPFye9VH2nt3PN63SMKh70qfNNb6Bu/DHiz2pOI25GY25Com5O4v/YTg2OcQxryIK+ujIrgm9lKFI58W+T3edBfNmaiSjrz1+melMixpxqzVnB0NWujnp9Q+6odQ7zFwhb/8i9um6vaFAhX/FH3gzLEv6FJneVf33Nlc7ofzNC7TfzMuzt5txruRfHP8d/58Z81z7GeeXdXrFfcY5CKGK9Wa7EzAy+DwaAeW08xgYeVS6zYPnLPjee9Gzi4AwoGPiOKxv+X2rsdtTt4Ch2qLF1aMMD1PT88X2pVDtjWqr4Y/ErVDQ1vPO9jugesxGJCEpMVtQkYvGN1Wu26UKuxKq6jnZzAtzQr6ZihwEwFtuNgJkfN2kIAWKb2C/66i858KbBzB4pF/y51pi21hFjhzUolEbclMbcmUTcjcX/lLwfHOIc05EFeXRk64NqFY94XBf0e9ZcHoK6WzlxttVEix8w0HobH7BUcHo4PAZi8DB+KhS3+wMAPhCL+aPlBWeJHoH+1/iVYkscHJ10tfjLm3Z28K7Pyz/HfHfGfNc+xnnl3H++4NwxaMXjFS2DUoF5N4KFtsFMBbYUB8COI8/1fvPG77a3r+Z+3VJCxftgrwjvxM/IB4ixIqP/XpengnfSF8Ax77ZR4DvzaIUnM//S2w60fqTL8hov+ipfegGusOONFQJiQxGQFniHFm57V4N0pq7HlWiDpaiYHs7ZwfCxP461AEDw6QHSEEDxmOR/v9Ng1nSB6615sIL/3fcIz+AVRNOZD4ZvR4lSysOd5RhsScyuRM66pyP7xS///4hjnkIY8yBv4/wooG9fAtXBNax2A9U3qrOj+1LVdL/zbac+W1Bl1R9BSW22UyDFDDUeHwzt5hr4sq5T4+zx/fc9treptDGz/isQfKT8oT/x4CHz4azcPrPevs9+g+qpAz+IvNubdnbwrC+Sf47/z4z9rnmM98+5O3jF4VYN6NYGHFUu0DZ6zxLZUcK8G9oiZj6FdR75RbcTONvX9b8y0Aj6At4t6hr1K8fgD8oVPiTNwWRoqf+B55Mf/4f9Rjo5jAAO5lV/XOd77uRvnJlx9zocl9YOPwlcV13hOEhOSapJODd6dsusiKMPNKeLh4HB0ODwcH28DUoJHB4iOEJ07Zm6xdQXPIzxGneZz6DxXf117UeAMLoBvg4Aoz5AXhWf466JwwieiYNI3JOaW4o/xTcSeESeFjmOcQ5pnRmsSelvhm9ZUEl844i0ZQFAWtv5Yr6GAwDPwxRu/KxH4Y4SHCJhlxg8SOCyCFoIXth4okcPBcc/WWRvHEx9gERE/guuO1vW36rgJFD/8ABwH6wfBih9BHjPzT9S88D9Ur8dL6sfi1xvz7k7eleE+lQ9w/HeHD7DmOdYz7+6K9Vbu1QQe2gJtgrbB7gzFPWIkVm0R5/GWULQrdjg8jljf5sGrO877pOZiGuQd1HETKWAQt65JneMT3rll3Zf3XtXn2gv/gmegUQ/0O+h/VEyHr2LgrrjGc5KYmMQEpZqkc8tEbSkrT/Do+NABqs4dM7fYloNnLjAj4hc94clX6l3yOTpWdPI5nZIOB5J1PCNFHElLEZQm9qYmoCP2p+EY55CGPMhr/V8rMEO8qXndtZPerT7qy7uvbIlrE6wCh0PimQn8EMEPEtWZI3ghiGELghK5k2dnQ7GIib/F/f9MnfnRLePK6gAi5QcI8Is+qzkTPyzrXv23N3H9knqw+IM35t3d2rfyz/HfHcaad6fmmXd38w6gDdAWaBO0jZV7xEjEeWxNx/PG2L6K9lX8I75iRRQcyHjf9alr+838sMaCDU3rZu9oU/+IjkMdstsl4sPgJ35qXu/Igk9uyx7xZrVFPZ69bvgjNS5qQWU/QUCfguth9RU8Y5IBg3b0P+iHENPhq1ausQKtVmLdNng/xXDTinhFuhI8OkB0hOjcsWUF+7AxE4IZESV61cFDaFL4hCchwi/uvrIVZnhmfHjL+K0t6m38tUPiYYh5X2qi2N66Pj4IKYFjnEPa0fQUfDwwl8S/EcD/jn6z6jCUdc+N576HskuuAQfDjKzqyFEXCBwOCcfEFiL8IEHdcQ9w4LJE7kriA0z5QMTFj04AP8Lwgw9+AI6D8YNfWtXfCh/A/+H/Oz52TeeSH3JPEVj8kTHm3d2G+1c+wPHfHab4Zs27y5h395riHm2BNkHbWLlHjMQODWy/x+AY7Yr2Bf+Iq5gow4ooOIAPIN5b/QBcITYD4K4sqDzIr+I4+g0Vy7HDAn0K4jn8Di/0weQcBu14Dhr9EGI6fBX1Vly7ZcdFSKYTvOrcMXOLbTl4DgHigYggejxUjw4es6IQmhI+OnmIEKSDMAgTJD5DeI7wMuENwtslwDHOPU/AsxCKfJCO/wXxKAuOhLJxDYgbs8b4caE6cjgiPh6LB4HhoJhtVjOz1s6ciS/boi1+8BqMHyAP/IDFHxtj3t1tin+A4787jDXvTmPe3Wtlca/iPJ63RHuiXcE/4qmK9VjBBQeIuYj34AV+gHgMX0BsBm8A4j8A31DHKg35kB//h/9HOYjl8C0M1rHyquI5/A+Tc5hswDPf6IdQT/gq6o36B3LNfAeYlXRr545tOXjmAjMhSvToPNHBYwYXQoPwVScPEUL86OghTAgUhEL8EDE67xcI+DgkxI9AAFHDCZAP+UE8/hcdOIiHI6FsBBeIG7PGcDg4HhxQCRyOibrCUVF37sxDt2iJH7xC4AjegX6AY/gB0pQfsPhja8y7u83KP8d/dxhr3p3GvLvXrNyrOI/BMAbFaE8r/4j1mMxD24MD7IJAvAcviMOI+fAF8AV/AHcA+gAFdQ7xG/mQH/8HP0I5KA++hfKxUoy+BX6H1VfwjMk5NWhXMZ25DtEU6QBIRwOCdCV6awcPgUFoEL7q5CFCdLro6CFMawBAJw0hQ9CqA0fnjR8BcADkA/HovPG/KAOBBPu9UTaCC2ZpcE04nOrIlcDVbA135pW3SItfCR+BG0E80A9wDn6gAgCLPz7GvLvbFP8Ax393GGvenca8u9cU94p/tKOVfxXrsRKKtocPYMfGlQT4AeIwOEJMxuop4jO4A9AHKKhzSEc+5Mf/4f/BL8qDb4Fj7LBA32KN5+BZDdo5plfSAkm3il518BAYhAbhq04eIlQdvSJdEW7t7AEEA4gZnTYcAPkgaEU8yoADoUyUjWvAweBoakYWxKuO3CpwJj4yFknxoyOAH+CHWqAfqB9vSGfxx9+Yd3dbIP8c/51vrHl3GvPuXkPbKf7RnoH8I9YrH0C8Bx/wA8R8cARfAF+Iz/AJ8BcInEc68iE//g//j3JQHnwLHGNXCK5njeeBPDPXETAr6Yp41cFDYBCaIh3EgCDV0SMAoCMGmSBXBQEIGMAxfgDgvCIepKvO20o8HEp14rhmYEfOxEfXrH6g2jtU8YPf8vwAP97gByx++xjz7m6z8q98gOO/s83KuWpb1rzzjXl3t1n5Vz6ANlc+gHhv9QNwpOI+AJ8Af4HAeZUH+fF/+H/FL8oN5Jh5jpHpSAdAhlX86HStAcAaBNDhQ8AAjgGcV8QHkq46cB3xqh5MfGxN5wfBir88P0AAYPHb15h3d5uOfwC8KB8AXxz/nWM6zlnzzjfm3d2m2jrQB6x+oHxBAdwpv1BQ56z51P8G8qvAPMfJyiO9LOKtZKOztnbYVuKtpOuIt16bLb5m5SLQD8oSf6APBP5wU7D6QaAPWP2ALfbGvLvbyuO/LB9Q/Ft9QPHP8d/+Zm33QM5Z88415p3N6gOAlSMFxZ8OuvyBZbLZ0KwE6UjUkW2F7n+sZQJs9rZAvnSc6rhX0OUPLJPNfhbIkY5HHd8KuvyBZbLZ26xc6fjU8W6F7n+sZQJs9rFAbnT86XhW0OUPLJPNfhbIkY5HHd8KuvyBZbKZY4HclQc2h5iO3PLA5kzTcV0W2JxjOn7LApvzTMdzeWAz33S8lgU255iO37LAxsbGxsbGxsbGxsbGxsbGZhf7n//5/0P/SBGNEbe4AAAAAElFTkSuQmCC)
Hint:
Write the whole number part and the fraction part together to make the mixed number.
Question
Hint:
Write the whole number part and the fraction part together to make the mixed number.