Mister Exam
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How to use it?
- Equation:
- Equation (4^sin(2*x)-2^2*sqrt(3)*sin(x))/sqrt(7*sin(x))=0
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Equation x^(lgx+1)=100
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Equation sin0,5x=-(sqrt(3)/2)
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Equation 4cosx+sin3x−8x=x^3+4
- Express {x} in terms of y where:
- 5*x-5*y=20
- 8*x-7*y=-13
- 15*x-15*y=16
- 9*x+18*y=6
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Identical expressions
- (four ^sin(two *x)- two ^ two *sqrt(three)*sin(x))/sqrt(seven *sin(x))= zero
- (4 to the power of sinus of (2 multiply by x) minus 2 squared multiply by square root of (3) multiply by sinus of (x)) divide by square root of (7 multiply by sinus of (x)) equally 0
- (four to the power of sinus of (two multiply by x) minus two to the power of two multiply by square root of (three) multiply by sinus of (x)) divide by square root of (seven multiply by sinus of (x)) equally zero
- (4^sin(2*x)-2^2*√(3)*sin(x))/√(7*sin(x))=0
- (4sin(2*x)-22*sqrt(3)*sin(x))/sqrt(7*sin(x))=0
- 4sin2*x-22*sqrt3*sinx/sqrt7*sinx=0
- (4^sin(2*x)-2²*sqrt(3)*sin(x))/sqrt(7*sin(x))=0
- (4 to the power of sin(2*x)-2 to the power of 2*sqrt(3)*sin(x))/sqrt(7*sin(x))=0
- (4^sin(2x)-2^2sqrt(3)sin(x))/sqrt(7sin(x))=0
- (4sin(2x)-22sqrt(3)sin(x))/sqrt(7sin(x))=0
- 4sin2x-22sqrt3sinx/sqrt7sinx=0
- 4^sin2x-2^2sqrt3sinx/sqrt7sinx=0
- (4^sin(2*x)-2^2*sqrt(3)*sin(x))/sqrt(7*sin(x))=O
- (4^sin(2*x)-2^2*sqrt(3)*sin(x)) divide by sqrt(7*sin(x))=0
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Similar expressions
- (4^sin(2*x)+2^2*sqrt(3)*sin(x))/sqrt(7*sin(x))=0
- (4^sin(2*x)-2^2*sqrt(3)*sinx)/sqrt(7*sinx)=0
(4^sin(2*x)-2^2*sqrt(3)*sin(x))/sqrt(7*sin(x))=0 equation
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The solution
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sin(2*x) ___
4 - 4*\/ 3 *sin(x)
-------------------------- = 0
__________
\/ 7*sin(x)
$$\frac{4^{\sin{\left(2 x \right)}} - 4 \sqrt{3} \sin{\left(x \right)}}{\sqrt{7 \sin{\left(x \right)}}} = 0$$