\ frac {5 x - 1} {5} - \ frac {1 + x} {2} = 3 - \ frac {x - 1} {4}x\ theta ^ {6} =f (x) = - 2 x ^ {2} + 8 x + 4\ frac {3} {7}2 x ^ {2} + 3 x793 \ Times 27y = x ^ {2}\ sqrt {\ sqrt {(\ sqrt {x ^ {2} - 5}) ^ {2}} + 5}(3 - 4 i) - ( - 3 - 4 i)x ^ {2} - 7 x + 12 \ leq 0\ frac {2 ^ { - 6} m ^ {13} n ^ {7}} {5 ^ { - 2} m ^ {7} n ^ {13}}10 \ Esquerda |X-3 \ Right |= 408 x + 5 = b x - 7\ esquerda (\ begin {Array} {l} {1} \\ {2} \\ {3} \ end {Array} \ direita) + \ esquerda (\ Begin {Array} {l} {4} \ {{{{5} \\ {6} \ end {Array} \ Right)Yustart {e ^ { - e com}}(\ frac {28} {48}+ \ frac {24.5} {50}+ \ frac {x} {48+ 52}) \ times 0.1+ \ frac {8} {10} \ times 0.15+ \ frac {15} {30} = 0.5\ frac {4 x ^ {1/2}} {8 x ^ {1/3}}21 m ^ {3} n ^ {2} + 3 mn ^ {2} - 6 mn ^ {3} + 9 m ^ {2} n ^ {2} =10 \ Esquerda |X-3 \ Right |> 40a ^ {3} b ^ {2}, 7 a c ^ {4}, 14 b ^ {2} c ^ {3}- 2 x - 14 = - 2x + 3 y + 71 + |x + 7 y + 19 |= 0\ lim_ {x \ rightarrow 0} \ esquerda ({x}^{x} \ à direita)2 \ cos 2 \ teta + 1 = 0(x - 5) ^ {2} - 9 = 0b ^ {2} - 4 b + 4 = 0\esquerda.\ begin {Array} {l} {\ alpha ^ {3} + \ beta ^ {3}} \\ { + \ gamma ^ {3} =} \ end {Array} \ right.Yustart {12} + yustart {75} + yustart {108} =\ sqrt {e ^ { - t x}}3 ^ {2} \ Times 4 ^ {2}y = - 2 x ^ {2} - 8 x + 1x + 4 y> 8- 7 = 7 J + 28|x + 3 y + 7 |+ |x + 7 y + 19 |= 0\ esquerda \ {\ Begin {Array} {l} {x y = 1} \\ {x + y = \ frac {3 \ sqrt {2}} {2}} \ end {Array} \ right.- 8 - 8 y = 6 - 2 ex - 2 x ^ {2} = 8\ esquerda \ {\ Begin {Array} {l} {x y = y} \\ {x + y = \ frac {3 \ sqrt {2}} {2}} \ end {Array} \ direita.x ^ {2} + 3 x + 2 <010 x - 5 x + 2 y - 2 y + x\ log_ {2} ({32}) = xy = \ frac {2} {3} x + 42 + 2 y + x + y({9}^{6}3 x + 2 x ^ {2} + 4 =x (2 x - 3) = 20{\ esquerda (\ frac {1} {5} \ direita)}^{-1} -{\ esquerda (\ frac {1} {7} \ direita)}^{-1}eu\ frac {9} {5} z (5 z - 3)e ^ {2} + 2T _ {2} = \ frac {1,520 mm \ times 290 ^ {\ circ} k} {380 mm}x \ sqrt {2 x}\esquerda.\ Begin {Array} {C} {\ frac {3} {2} a + b = 1} \\ {a + \ frac {b} {2} = 7} \ end {Array} \ right.\ log (01)\ esquerda \ {\ Begin {Array} {l} {2 a x + b y = 14} \\ { - 2 x + 9 y = - 19} \ end {Array} \ direita.\ frac {\ sqrt {2 x}} {x}15 \ vezes 8q = \ frac {k (2) (3) ^ {2}} {8}2 x ^ {2} + 8 x - y + 8 = 0( - 2) ^ {3}\ log (25){0,5}^{3}2 x ^ {2} + 16 x + 24\ frac {\ frac {8} {5}} {\ frac {2} {25}-\ frac {5} {16}}(38) = 56 - 14\ frac {2} {3} - 5 x = b x + \ frac {1} {3}(\ frac {28} {48}+ \ frac {24.5} {50} \ frac {x} {48+ 52}) \ times 0.1+ \ frac {8} {10} \ times 0.15+ \ frac {15}{30} \ Times 0,75 = 0,5\esquerda.\ Begin {Array} {l} {3 -3 y = -4} \\ {\ text {Resolva para} z \ text {where}} \ {z = -2 y} \ end {Array} \ right.\ log _ {e} 2y = - 2 x ^ {2} - 8 x + 99 = \ frac {k (2) (3) ^ {2}} {8}18 \ Times 1 \ Div 20g ^ {1} (3)- 5 x - x (x + 2) (x - 4)(4 x - 1) ^ {2} = (x - 1) (x + 1)7 ^ {3} \ cdot 16 ^ { - 9}{x}^{2} 4x+3 = 0y = \ tan ^ { - 1} ( - 2 x)x ^ {2} + x - 56 = 0699 \ Times 533\ frac {3} {n^{2}} = \ frac {n-4} {3 n^{2}}+\ frac {2} {3 n^{2}}- 4 x + 60 <72- 2 x ^ {2} + 12 x - 14> 0(2 x + 5) (2 x + 3)7 - 2 \ Times (3 x) =6 x - ( - 2) = 263 \ CDOT (1 + 3) ^ {2} + 2 ^ {2} + 2 ^ {3}2x+ {x}^{2} -4 {x}^{3}\ log _ {7} 1 - \ log _ {1} 4\ frac {2} {3 - 1}\ int \ frac {d x} {x \ sqrt {x + 1}}f (x) = 340 (0,025) ^ {x}64+81 =\esquerda.\ Begin {Array} {l} {x - 3 = y} \\ {4 x = 37 + 3 x} \ end {Array} \ Right.4 \ vezes 16\ {[(3 * z ^ {2}) ^ {5}] ^ {3} \} ^ {6}(u + 3) (u - 6)\ log (0,4)(43.3-x) {\ esquerda (x+7.35 \ direita)}^{2} = 27562.58 x ^ {3} + 5 + 7 x ^ {2} + 6 x?{(e)^{ - \infty }}(\ frac {28+24,5+x} {48+50+48+52}) \ Times 0.1+ \ frac {8} {10} \ times 0.15+ \ frac {15} {30} \ times 0.75> 0,52 \ cos ^ {2} \ theta + 9 \ cos \ theta + 4 = 0(5 C + 3) (4 C - 7)f (x) = \ frac {1} {6} x ^ {3} + \ frac {1} {2} x ^ {2} - \ frac {15} {2} x - \ frac {43} {6}2 + 2y = \ frac {7} {(x ^ {3} - x ^ {2} + 7 x) ^ {5}}(x + y) ^ {2} = 5(\ frac {x ^ {3} y} {4}) \ div (\ frac {4} {x} \ div \ frac {6} {y ^ {3}}){4}^{4}\ sqrt {1 - 2 (x ^ {2} + 3 x)}{x}^{2} = y\ sqrt {\ frac {5} {20}}59 - 7 (38) = 56 - 1451 x ^ {4} + 3 x ^ {2} + x + 2f (x) = a _ {0}(3 x ^ {3} + 11 x ^ {2} - x - 3) \ div (x ^ {2} + 4 x + 1)(0)75 x - 25f (x) = \ int _ {2} ^ {x} (\ frac {1} {2} t ^ {2} - 1) ^ {6} d tx ^ {2} - 4 x - 5 = 0a ^ {3} - 4 a ^ {2} + 2 a - 12 \ cdot \ sqrt [3] { - 125} + 4 \ cdot \ sqrt [5] {32} - 6 \ cdot \ sqrt [3] { - 8}- x - 2- x - 2(32 \ sqrt {3}) \ Times 2\ frac {1} {2} x+x = \ frac {51} {x}\ frac {(3 x ^ {2} y) ^ { - 1} x ^ {2} z} {3 y ^ { - 1}}7 (\ frac {11} {20+7}3 <2 x + 1 <115 {x}^{2} +12x-4> 6\ int \ sqrt {\ tan ^ {5} x} \ sec ^ {4} x d x =\esquerda.\ begin {array} {l} {a ^ {c} = b} \\ {\ text {resolve para} a \ text {where}} \\ {a = c} \ end {Array} \ right.3 x + 2 x ^ {2} - x ^ {3}\ frac {X-120500} {x} = 0,025- {\ esquerda (X-4 \ Right)}^{2}( - 5) ^ {3} =6.5 \ Times 419 \ Times 9 =\esquerda.\ Begin {Array} {l} {3 t - 3 = 5} \\ {4 s - 37 = t} \ end {Array} \ Right.\ lim _ {x \ rightarrow 2} \ frac {\ sqrt {x - 1} - 1} {\ sqrt {x + 2} - 2}\ lim _ {x \ rightarrow 1} \ frac {\ sqrt {x} - 1} {x}(n - 2 \ sqrt {2}) (n + 2 \ sqrt {2})3x = - \ frac {4} {3} + \ sqrt {52}= 1f (x) = - 12,5 x ^ {2} + 1,375 x - 1.500\ frac {19} {56} - \ frac {1} {72} - \ frac {10} {84} + \ frac {8} {63} ==\ frac {1} {4}{8}^{\ frac {2} {3}}2 x - 5 = - 13{\ esquerda (\ frac {3} {7} \ direita)}^{-2}\ theta = \ frac {\ sqrt {3}} {2}5 ^ { - 1} - \ frac {1} {2}\ int x \ sqrt {2 x + 1}(15 \ div 3.6) =(n - 6) (n - \ frac {1} {2}){\ esquerda (\ frac {15} {3.6} \ direita)}^{2}252 \ CDOT 338+2040000 \ div 85000a x ^ {2} + 3 x - 37 (4 x - 1) + 6 x> - 279?x ^ {3} y ^ {4} z ^ {4}, x ^ {2} y z ^ {3}, x ^ {2} y ^ {2} z ^ {2}y = - \ frac {1} {4} -424 {x}^{2} +16xy +8 = 842 (y - 1) ^ { - 3} + (y + 3) = 5 (y + 1)|- x ^ {2} + x - 1 |\ leq 2 x + 5x ^ {2} - 5 x + 3 y = 20\ frac {2} {5}\ int {x \ sqrt {2x ++ 1}} d x x\ frac {3} {4} + \ frac {5} {6} - \ frac {15} {12} =77 \ div 4400\esquerda.\ Begin {Array} {C} {x _ {1} + 2 x _ {2} - x _ {3} + 3 x _ {4} = 0} \\ {2 x _ {1} + 3 x _{2} - x _ {3} + 2 x _ {4} = 0} \\ {x _ {1} \ quad + 3 x _ {3} + 3 x _ {4} = 0} \ end {Array} \certo.949 - 2 =3 x + 28 \ leq 25\esquerda.\ Begin {Array} {l} {\ frac {x} {3} - \ frac {y} {2} = 8} \ {\ frac {x} {5} + \ frac {y} {3} = =1} \ end {Array} \ Right.[\ frac {(f ^ {3} g ^ { - 8} h) ^ {7}} {(g ^ {5} h ^ { - 3} f) ^ { - 8}}] ^ {5}1 - \ frac {x} {4}> 2(1,53 \ CDOT 3X-3+ \ frac {4} {{x}^{2}} = 0- x ^ {2} - x - 1 = 0\ frac {1} {2} \ times \ frac {5} {4}949 \ div 2 =(6 e ^ {2} - 8 e ^ {3} + 3) 7 e ^ {5}x ^ {2} - 3 x = y + 3565: 7 =x ^ {2} + 2 x - 15 \ geq 0\ frac {2} {5} \ times 3 \ frac {1} {9}f (x) = \ frac {7} {(x ^ {4} - 5 x ^ {3} - 12 x ^ {2} + 36 x)}( + \ frac {1} {2}) + ( + \ frac {2} {3}) - ( - 1 \ frac {1} {6})- 5 x ^ {4} y\ frac {x - 2} {6} \ geq \ frac {x - 1} {9} + \ frac {7} {18}( + \ frac {1} {2}) - ( + \ frac {2} {3}) + ( - 1 \ frac {1} {6}) =\ frac {6 - x} {x - 2} \ leq \ frac {4 - x} {x + 2}y = h ^ { - 1} (x)2 \ cdot \ pi (\ frac {x} {2}) ^ {2} \ cdot \ sin (x)
