# pt/0kMzeUepq05T.xml.gz
# zul/0kMzeUepq05T.xml.gz
(src)="1"> Um fazendeiro tem 531 tomates e é capaz de vender 176 deles em três dias .
(trg)="1"> iedjcxjksxjkski, eskldskeskdskkjrfikrfko, df567hfc ydjcjcjxkxkxkduududjfjcjcj888888jcjvj ju hc vhhjskjjzxmjmxmsdjfjhdcdd
(src)="2"> dado que seu estoque de tomates diminua em 176 , quantos tomates ele vai ter sobrando no fim desses três dias ?
(src)="3"> Então ele começa com 531 tomates 5 centenas , deixe- me dar um pouco mais de espaço para trabalhar aqui
(src)="4"> -- ele começa com 531 tomates e pode vender 176 então essencialmente ele vai subtrair os 176 que ele está vendendo se queremos descobrir quantos sobraram para ele , então nós vamos subtrair 176 esse é o tanto que ele vende em três dias então estão nos perguntando :
(trg)="2"> hjdwhjshgdsbdxvbdcbdvbxc76980jdujshdufjuejejj jxzxjhjngcgcgccvhdshnududdjxjmjcmmxmxmx ,,,,,, xjxjhjds ncvnvnvnhfhfvbhfhbhfgujfvcjvhfjgdihrigfkdjvcnjdmvn ;;;; dcgcggcgcgx888bjjfjf88383883 n n n nn n n n n bfgghhhghghghgghhghgvuiccududiudsusiisuycgcvhvccvhchjxchcxcxnchvhvcjfhvufhhvf nvn n nhvchnvvvjjvjfhfjfjkvhydccvydvjdjfuy004949949 hjfhbbtgrebgtrbfgbtrbgbbgbfgbhghhghgh ghfhgdfgfdfbgfcfsdadfxadgfvxdagfvdsfffgdgfbgcfgfgfcgbdcbdbgd vbhv7438473847385785hc vghfgvdhfhdhfhfhhf itittiituyuyiyiituyuiitutjutjvhhjhyfurjurhtrjtjhyturudued gdgffgfhrhdehgdgfgfgndfgfhgusdjusfilurfjufhfhfehgfdhhdf gbcxgvgddghhhfrhfjfhjfkrkrjdhgfhfhfhfhf hgfhigfhgfhgtgidufjghjfigfufkdjkjfhjdfkdjgfjfgjfjgjfjjg vdxhhdjfffffffffffffghjfffffffffffffffffffffffffffffffffffffffffffffffffffhgggggggggggggggggggggjffffffffffffffffffffffffffffffffjfjfjjfjfjfjfjfhghghghghghghghghghgghfhhfhf gfhfghgfggjgjhgjkflfkglfkglfkfkgfkglfffffffllgkflgklfkgfflflflflflflflffffffff hdgvgcvgvvfhfbhfgbhfvhdhjdhfjdhfhjdfgjdfhgjfdfkfdkkdkddk999999 jcvhjcvhjchvjchvjchvjchvjchjvvhjcjccjcj ..... foeur4eurieuieurieuriueirujjjjcjcjcjcjjcjc --------- ggfgedhfhdfshhdfh hvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvvv jk . xk fghfhvfhdfjhdhj bcnfhdfjdjjdjdcjcfyheeyhydhdhdhdhdhyeyeeyye jucjcjvhvhfjdjkjxj uehdhdjdhccchc ijfjfjdjdjsjxjxxjjchchvchchccghfchdfdjdsjudjdjdjhcxhxh fvjvjvjvjvjvjvjvjvjvjvjvjv, m xhhxhxjhcbsfdhsj 373737373737dxbcbcbccccncnchjdjssjhshdhhgfhdjdshsjsahsjasjj 500=30=1 cxgbchdhsgdhegfsjdshgfhh bcbcbchxbzxgfxcdvdxvfxhzshzsjhshshsgshshsh 63w363662gxgxgxsgsgdx623626bxbgxbgxxbvxvxbxbxxbgxssxhshhshshshxhhx vbddhdhdhdhdhdvgcc 7dhdhd7dhdhdhj888sdhdhdh8d8d8d88d888 hvjfjhftydghjshyfvghdfdt ufeyir474
# pt/2sdXW7OHwnnb.xml.gz
# zul/2sdXW7OHwnnb.xml.gz
(src)="1"> Agora que nós temos uma boa compreensão do teorema do confronto , nós iremos usá- lo para provar que o limite -- vou escrever em amarelo -- que o limite , quando x aproxima de zero , do seno de
(src)="2"> " x " sobre " x " é igual a um
(trg)="1"> Manje ngoba sinolwazi lwe squeeze theorem , singayisebenzisa ukubonisa ukuthi i limithi - ngizo ngizoyenza ngombala ophuzi -- ilimithi uma u x eya kwiqanda ka sine ka x phezukwa x ulingana no 1 .
# pt/8TU0l3q5SQZ4.xml.gz
# zul/8TU0l3q5SQZ4.xml.gz