aritmethic exercices, Exercises of Mathematics

arithmetic exercices, allow you to get the foundation needed for other topics

Typology: Exercises

2020/2021

Uploaded on 04/30/2021

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CALCULS
I) Fractions :
A =
4
5
2
5
(
1
3
3
)
B =
2
a
7
5
×1
a
4
a
2
C =
3
2
1
1,5+1
×53
18
D =
a2+
(
1
2a+1
a
)
2
5
4
E =
7
6
a
3
14a
14
×a2
7
F =
2+3
2+7÷
(
5
3
)
2
G =
7
18
×2
7
(
5
3
1
)
2
+1
H =
(
2
5
3
4
)
2
÷5
8
8
3
I =
J =
3
4
2
3
3
4+2
3
÷
4
5
3
4
4
5+3
4
K =
a+a
3
a
2
2a+3a
4+a
3
L =
5+32×2+4
12×2+10
M =
2
a+1+
11
a
1+1
a
II) Puissances :
A =
49×(2)5×(3)2
73×16×33
B =
(5)4×72×(2)3
(4)4×(1)5×25
C =
(
(a2b4)2
a3
)
3
D = 0,0000000005×1004000000
E =
23
34÷22
35
F =
(a2b)3
(a)(b)2
G =
(
42×84
907×302
)
3
H =
(
55×243
(1007×156)4
)
2
I =
22×1010×27×106
32×1015
J =
(
a3b2
a4b3
)
2
×(3a2b3)3
(21ab)2
K =
53×38×52
125×52×81×70
L =
0,9×7×101×250
14×103×0,5 ×102
M =
(568×812×257)3
(505×7003)4
N =
0,04×22×(102)3×102
3×108×102
O =
25×(102)5×121
11×75×109
P =
9n+1+9n
32n+132n
(n )
Q =
(ab2)2(ab1)3(a2b)2
a2c5(a1bc2)3
R =
(ab2c3)4(a4b5c6)2
(a7b8c7)3(a6b5c4)2
III) Racines :
A =
2+3
86
50
B =
2+
1
2
1
8
C =
3
32
D =
2
21
75 a2
35
20
E =
(
102
5
4
)
2
+
(
1+
5
4
)
2
F =
(
2+
7)3
G =
(2a+
b)
2
+(12a
b)
2
(2a
b)
2
H =
3
32
32
3
I =
3
5+
20
45
(
25
6+4
3
)
(1
3)
J =
(4+3
2)
2
(2+
2)(
21)
K =
7+4
3
74
3+
74
3
7+4
3
L =
3+
2
3
2+
3
2
3+
2
M =
0,04
0,0016 +
0,01
0,04
N =
(
2
2+
2+
2)2
O =
a6+a6+a6+a6
52+52+52+52
P =
6
6
6
6
4
27
3
3
Q =
48 a6b12
243(ab )4
R =
480+5×853
28×2155
S =
(
1+
1a
2
+
1
1a
2
)
2
(a [0 ; 1])
IV) Factorisations :
A =
x29(2x 6)x+( x 3)2
B =
(x 11)2+( 33 3x)( x+2)
C =
(x41)(x2+2x+1)
D =
0,3(2x 3)2+0,7 x(1,5 x )
E =
0,25 x2 x+1
F =
x23x+2
G =
9x26x 1
H =
10+( x+5)22x
I =
2x2+x+1
J =
x2+2
2x+2
K =
x22
L =
4x212 x+8
M =
x (3x 1)3+2x 1
N =
(2x 1)x+(12x)2+
(
x 1
2
)(
x 3
2
)
O =
x2
(
1+1
x
)
+2(x+1)2
P =
x2(x+1)2
Q =
5(1 x)245 x2
R =
(x+1)22(x+1)+1
S =
x5+4x4+4x3
T =
(5x 1)( x+3)+3(25 x21)
U =
49 28 x+4x2+(72x)(53x)
V =
x2(x 4)+2x(x 4)+x 4
W =
x2+6x+5
X =
3x2+7x+2
Y =
2x2 x+1
Z =
2x23x+1

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A I) Fractions : CALCULS

B

a 2 (^) − 5 7 (^) ×

4 a (^) − 2 a

C

×

3

D

a − +^2

(^2) a 1 (^) + a^1

2

E

3 a

14 4a × (^) a (^72)

F

÷

2

G

×

2

1

H

÷^2

I

3 a (^) − 3 a (^) × (^21 ) (^) − (^217)

J

÷

K

a

3 a − 2 a

a

(^3) (^4) a

3 a

L = − 5 + 3

×^2

×

M

a

1

1 − a^1

a^1

A II) Puissances :

= 49 × (− 2 ) 5 × (− 3 )− 2

×^3

×

− 3

B

×

×^2

3

×

×

C

a (^2) b 4 ) 2

a (^3)

− 3

D

×

E

3

(^4) ÷ (^2) 2

5

F

a (^2) b ) 3

a ) (− b ) 2

G

− 2 × 8 4

×^7

− (^2)

3

H

×^5

− 3

− ×^7 15

)^6 (^4)

2

I

×^2

− 10 × 2 ×^7 10 − 6

×

− 15

J

a (^3) b − 2

a b^4 − (^3)

− ×^2 (^) ( 3 (^) a (^2) b )^3 3

− (^1) ab ) 2

K

×^3

×^8

2

×

×^2

×

0

L

×

×

− ×^1 250

×

3 × 0,

× 10 − 2

M

×^8

− ×^2 (^25)

)^7 3

5 × 700

)^3

4

N

×

− 2 × ( 10

− )^2 3 × 10 2

×

− ×^8 10 − 2

O

×

)^2

− ×^5 121

×

×

− 9

P

n

+^1 9 n

(^2) n

−^1 3 (^2) n

( n (^) ∈ (^) ℕ )

Q

ab

)^2 2 ( ab − )^1 3 ( a (^2) b )− (^2)

a (^2) c − 5 ( a − (^1) bc

)^2 3

R

ab − (^2) c 3 ) 4 ( a (^4) b (^5) c − )^6 − (^2)

( ab^7 (^8) c )^7 3 ( a (^6) b (^5) c )^4 2

A III) Racines :

=

B = √ 2 + √

C

D

√^

√^ 75 (^) a 2

E

√ 10 − 2

√^

+^2

2

F

G

(^) a

b ) 2

( 1 − 2 (^) a

b ) 2 − ( 2 (^) a

b ) 2

H

I

J

−^2

K

√^

√^

L

M

N

√ 2 −

√ (^2)

O

(^) a 6

a +^6 a +^6 a 6

+^2

+^2

+^2

2

P

√^

Q

(^) a (^6) b 12

ab ) 4

R

80 +^ 5 × 8 53

×

155

S

√ 1

√ 1 − a 2

√ 1 − √ 1 − a )^2 2

( a (^) ∈ (^) [ (^) ; 1])

A IV) Factorisations :

= x (^2)

- (^) 9 (^) (^) ( 2 (^) x (^) (^) 6 ) x

( (^) x (^) (^) 3 ) 2

B

x (^) (^) 11 ) +^2 ( 33 (^) (^) 3 (^) x )( (^) x

2 )

C

x (^4)

- (^) 1 ) ( x +^2 2 (^) x

1 )

D

(^) x (^) (^) 3 ) 2

0, (^) x (^) ( 1, (^) (^) x )

E

(^) x (^2)

- (^) x

1

F

x (^2)

- (^) 3 (^) x

2

G

(^) x (^2)

- (^) 6 (^) x (^) (^) 1

H

x

5 ) 2

-^ (^) 2 (^) x

I

(^) x +^2 (^) x

1

J

x (^) 2

2

(^) x

2

K

x (^2)

- (^) 2

L

(^) x (^2)

- (^) 12 (^) x

8

M

x (^) ( 3 (^) x (^) (^) 1 ) 3

2 (^) x (^) 1

N

(^) x (^) (^) 1 ) x

( 1

- (^) 2 (^) x ) 2

x (^) 2^ 1

(^) x (^) 2^ 3

O

x

(^2

x^1

x

1 ) 2

P

x (^2)

- (^) ( x

1 ) 2

Q

(^) x ) 2

-^ (^) 45 (^) x 2

R

x

1 ) (^2)

- (^) 2 ( x

1 )

1

S

x 5

4 (^) x +^4 4 (^) x 3

T

(^) x (^) (^) 1 ) ( x

3 )+ 3 ( 25

(^) x (^2)

- (^) 1 )

U

(^) x

4 (^) x 2

( 7 (^) (^) 2 (^) x ) ( 5 (^) (^) 3 (^) x )

V

x (^2 x (^) (^) 4 )+ 2 (^) x (^) ( (^) x (^) (^) 4 )+ (^) x (^) (^) 4

W

x +^2 6 (^) x

5

X

(^) x +^2 7 (^) x

2

Y

(^) x (^2)

- (^) x

1

Z

(^) x (^2)

- (^) 3 (^) x

1