Products related to Equation:
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Florenzyme Capsules - 16 g
Nutritional supplement with bacteria culture (LAB2PRO TM), Alpha-Amylase and Protease. Vegan. Florenzyme capsules are an innovative nutritional supplement that combines selected bacterial cultures with valuable digestive enzymes (alpha-amylase and protease). A special capsule technology ensures that the ingredients are protected from the acids in the stomach and reach the digestive tract in a functional way. In this way, they can contribute to a natural, desirable digestion and intestinal flora. In terms of targeted nutritional supplementation, we recommend taking one Florenzyme capsule daily over a longer period of time with or after a meal.
Price: 21.86 £ | Shipping*: 14.50 £ -
Organic-Spelt Grass-Powder - 300 g
Spelt grass is a natural, vegetable dietary enrichment. Spelt, also referred to as husk or Swabian corn, is a close relative of modern-day wheat. Spelt was already grown and highly valued in central and northern Europe thousands of years ago. Village names such as Dinkelsbühl or Dinkelscherben testify the former relevance of this cereal as a foodstuff. Our spelt grass powder is obtained by gently drying and grinding young, organically-cultivated spelt plants. At the time of harvesting, the nutrient content in the young stalks and green shoots of the spelt grass is particularly high. Organic-spelt grass-powder tastes pleasantly aromatic and can simply be stirred into water, juices, soups or other food and enjoyed. Purely plant-based, vegan.
Price: 13.45 £ | Shipping*: 14.50 £ -
Traditional Sweets Sour lemon flavour - 170 g
Traditional sweets with a delicious, refreshingly sour lemon flavour. No artificial flavours or colours. Produced in line with ancient confectionery tradition using copper vessels over a fire and produced by hand. Taste as delicious as Grandma's very own! Sure to evoke childhood memories...
Price: 3.59 £ | Shipping*: 14.50 £ -
Traditional Candies Raspberry - 170 g
Traditional Candies with a delicious raspberry flavor. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories ...... With natural fruit and plant extracts, without artificial flavors or artificial colors.
Price: 3.59 £ | Shipping*: 14.50 £ -
Lapacho Bark Tea - 250 g
In South America, "Inkatee" has a long tradition. It is made from the inner, reddish-brown bark of the tropical Lapacho tree. Its typical, fine aroma with woody notes and light vanilla character makes it a tasty drink for all day long. Very good to enjoy sweetened with a little honey, or even cold.
Price: 7.56 £ | Shipping*: 14.50 £ -
Traditional Candies Propolis and Pine Honey - 170 g
Traditional candies with propolis and pine honey. Soothes neck and throat. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories ...... With natural plant extracts, no artificial flavors or artificial colors added.
Price: 3.92 £ | Shipping*: 14.50 £ -
Traditional Candies Sage Forest-honey - 170 g
Traditional Candies with pure forest-honey, sage leaves and sage oil extract. Soothing to the throat. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories ...... With natural plant extracts, no artificial flavors or artificial colors added.
Price: 3.92 £ | Shipping*: 14.50 £ -
Traditional Herbal Cough Candies - 170 g
Natural remedy for cough and voice hoarseness. Traditional Herbal Cough Candies made after a classic recipe. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories ...... With natural plant extracts, without artificial flavours or artificial colours.
Price: 3.92 £ | Shipping*: 14.50 £ -
Traditional Candies Organic Ginger-Orange - 170 g
With the sharp and spicy taste of the finest organic ginger root from controlled organic cultivation and the tangy freshness of sun-ripened oranges. Sweet production in the Kräuterhaus Produced in line with ancient confectionery tradition using copper vessels over a fire and produced by hand. Taste as delicious as Grandma's very own! Sure to evoke childhood memories... With natural fruit and plant extracts, no artificial flavours or colours.
Price: 3.92 £ | Shipping*: 14.50 £ -
Traditional Candies Eucalyptus - 170 g
Traditional sweets made according to a classic recipe. The unique combination of eucalyptus oil, mint oil and menthol has a soothing effect on the throat. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories ...... With natural plant extracts, no artificial flavours or artificial colours added.
Price: 3.92 £ | Shipping*: 14.50 £ -
Boswellia serrata Tablets - 103 g
The Indian frankincense tree (Boswellia serrata) is the oldest known agricultural crop at all. The amazingly long tradition of incense in the Indian food proves its beneficial, health-promoting effect in many areas. Used is the resin (air-dried), that exudes after cutting the bark. This is known as Indian Frankincense. Particularly appreciated are the boswellic acids contained in the resin. Each Boswellia tablet contains 400 mg Boswellia extract containing 70 % boswellic acids.
Price: 27.48 £ | Shipping*: 14.50 £ -
Traditional Candies Sea Buckthorn with Vitamin C - 170 g
Traditional Candy with a delicious fruity sea buckthorn flavor and and to keep your body's defenses healthy with an extra portion of vitamin C. We brought back the tradition of candymaking!Our candies are cooked in old copper kettles over the fire and are made by hand. They taste like your grandmother made it! It brings back childhood memories... With natural fruit and plant extracts, no artificial flavors or artificial colors added.
Price: 3.92 £ | Shipping*: 14.50 £
Similar search terms for Equation:
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What is the mesh equation and the node equation?
The mesh equation is a fundamental equation used in circuit analysis to calculate the current flowing in a loop of a circuit. It is based on Kirchhoff's voltage law and states that the sum of the voltage drops around a closed loop in a circuit is equal to the product of the current flowing in the loop and the total resistance of the loop. The node equation, on the other hand, is used to calculate the voltage at a specific node in a circuit. It is based on Kirchhoff's current law and states that the sum of currents entering a node is equal to the sum of currents leaving the node. This equation is used to solve for the voltage at a particular node in a circuit.
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'Equation and what?'
Equation and inequality are two fundamental concepts in mathematics. An equation is a statement that two expressions are equal, while an inequality is a statement that two expressions are not equal. Equations are used to find the value of a variable that makes the equation true, while inequalities are used to compare two quantities. Both equations and inequalities are essential tools in solving mathematical problems and modeling real-world situations.
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Is a linear equation the same as a parameter equation?
No, a linear equation and a parameter equation are not the same. A linear equation is an equation of the form y = mx + b, where m and b are constants and x and y are variables. A parameter equation, on the other hand, is an equation that contains parameters, which are variables that represent certain values in the equation. Parameter equations can be linear or non-linear, but the presence of parameters distinguishes them from regular linear equations.
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How can one reduce this equation to a quadratic equation?
To reduce an equation to a quadratic equation, one can use the method of substitution. By substituting a variable for a certain expression in the equation, one can transform the equation into a quadratic form. Another method is completing the square, which involves rearranging the equation to isolate the quadratic term and then adding or subtracting a constant to complete the square. Additionally, one can use the quadratic formula to solve for the roots of the equation, which can help in reducing the equation to a quadratic form.
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How can one convert a coordinate equation into a normal equation?
To convert a coordinate equation into a normal equation, you can start by rearranging the equation to isolate the dependent variable on one side. Then, you can simplify the equation by combining like terms and performing any necessary operations. Finally, you can rewrite the equation in standard form, which typically involves expressing the equation in terms of y = mx + b, where m is the slope and b is the y-intercept.
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How can a coordinate equation be converted into a normal equation?
A coordinate equation can be converted into a normal equation by rearranging the terms to isolate the dependent variable on one side of the equation. This involves performing algebraic operations such as addition, subtraction, multiplication, and division to simplify the equation. Once the dependent variable is isolated, the equation is in normal form and can be used to solve for the variable in terms of the independent variables. This process allows for a clearer understanding of the relationship between the variables and makes it easier to analyze and interpret the equation.
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What is the second-order difference equation for an inhomogeneous equation?
The second-order difference equation for an inhomogeneous equation is of the form \(y[n] - a_1y[n-1] - a_2y[n-2] = x[n]\), where \(y[n]\) represents the output sequence, \(x[n]\) represents the input sequence, and \(a_1\) and \(a_2\) are constants. This equation describes how the current output value \(y[n]\) is related to the previous two output values \(y[n-1]\) and \(y[n-2]\), as well as the current input value \(x[n]\). The inhomogeneous term \(x[n]\) represents any external influences or disturbances acting on the system.
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What is this equation?
This equation is the Pythagorean theorem, which states that in a right-angled triangle, the square of the length of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the lengths of the other two sides. It is represented as a^2 + b^2 = c^2, where 'a' and 'b' are the lengths of the two shorter sides, and 'c' is the length of the hypotenuse. This equation is fundamental in geometry and is used to calculate the length of any side of a right triangle when the lengths of the other two sides are known.
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Is this equation solvable?
Yes, this equation is solvable. By following the steps of the quadratic formula, we can find the solutions for the equation. The quadratic formula is used to solve equations of the form ax^2 + bx + c = 0, where a, b, and c are constants. By plugging in the values of a, b, and c from the given equation into the quadratic formula, we can determine the solutions.
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Which function equation fits?
To determine which function equation fits, we need to consider the given data and the characteristics of different types of functions. If the data shows a linear relationship, with a constant rate of change, the function equation may be in the form of y = mx + b. If the data shows a quadratic relationship, with a parabolic shape, the function equation may be in the form of y = ax^2 + bx + c. If the data shows an exponential relationship, with a constant ratio between successive values, the function equation may be in the form of y = ab^x. By analyzing the data and considering the characteristics of different functions, we can determine which function equation fits best.
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Which equation is correct?
The correct equation is: 2x + 3 = 7. This equation correctly represents the statement that twice a number plus three is equal to seven. By solving this equation, we can find the value of x that satisfies this condition.
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Is this equation correct?
Without knowing the specific equation in question, it is difficult to determine if it is correct or not. It is important to carefully review the equation, ensuring that all terms are properly written and that mathematical operations are correctly applied. If you provide the equation, I can help you verify its accuracy.
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