0
Salinization is the accumulation of soluble salts in soil or water, often resulting from irrigation practices, poor drainage, or natural processes. Its effects include reduced agricultural productivity, soil degradation, and negative impacts on water quality and ecosystems. Major causes include over-irrigation, evaporation in arid regions, and the use of saline water for irrigation. Solutions to combat salinization include improving irrigation techniques, using salt-tolerant crops, implementing proper drainage systems, and practicing crop rotation to enhance soil health.
What else can I help you with?
What was the causes of world war 1 NIMA?
N nationalismI imperialism M militarism A alliances (secret treaties) A assassination of archduke Fernidad and his wife
What does N-AV-N-N sentence pattern stand for?
The first n means the subject then the av stands for actionverb and the n after the av can be a predicate noun a pronoun or direct object
Should colonial legislatures be capitalized?
No, except at the beginning of a sentence because it is n ot a proper n ou n.
Why is pledge of allegiance capitalized in the pledge of allegiance?
The Pledge of Allegiance is capitalized because it is a proper nou n. It is a name of the US expressio n of loyalty.
What is 4mn to the third power over 10n to the second power in simplest form?
to find the answer, you have to find the prime factorization of the two monomials 4mn^3 2*2*m*n*n*n ---------- = ------------------ 10n^2 2*5*n*n then you cross out the common numbers (so in this case: 2, n, and n) the the ones that are left are your fraction in simplest form ANSWER: 2mn ------ 5
What are the solutions to the quadratic equation n2 -n -90 equals 0?
If: n squared -n -90 = 0 Then the solutions are: n = 10 or n = -9
What has the author N Pole written?
N. Pole has written: 'Environmental solutions'
How many Number of basic solutions optimisation problem?
The number of basic solutions in an optimization problem is determined by the number of decision variables. For a problem with n decision variables, there can be a maximum of n basic solutions.
How do you identify solutions to equations?
You'll know that you've found the equation's solutions when you end up with an expression in the form of x=N. Where x is what you're trying to find solutions to and N is either a number or an expression not dependent on x.
How do you when an equation has infinitely many solutions?
You may be able to give a formula that represents all the solutions. For example, the equation sin(x) = 0 where x is real, has infinitely many solutions but they can be summarised, very simply, as x = n*pi radians (180*n degrees) where n is any integer. Some solution sets are harder to summarise.You may be able to give a formula that represents all the solutions. For example, the equation sin(x) = 0 where x is real, has infinitely many solutions but they can be summarised, very simply, as x = n*pi radians (180*n degrees) where n is any integer. Some solution sets are harder to summarise.You may be able to give a formula that represents all the solutions. For example, the equation sin(x) = 0 where x is real, has infinitely many solutions but they can be summarised, very simply, as x = n*pi radians (180*n degrees) where n is any integer. Some solution sets are harder to summarise.You may be able to give a formula that represents all the solutions. For example, the equation sin(x) = 0 where x is real, has infinitely many solutions but they can be summarised, very simply, as x = n*pi radians (180*n degrees) where n is any integer. Some solution sets are harder to summarise.
What has the author H N Morse written?
H. N. Morse has written: 'The osmotic pressure of aqueous solutions'
What kind of polygon has 54 diagonals?
A polygon with n sides has n*(n-3)/2 diagonals.So you need to solve n*(n-3)/2 = 54n2 - 3n - 108 = 0 which has the solutions n = 12 or n = -9.Since a polygon cannot have a negative number of sides, the answer is 12.A polygon with n sides has n*(n-3)/2 diagonals.So you need to solve n*(n-3)/2 = 54n2 - 3n - 108 = 0 which has the solutions n = 12 or n = -9.Since a polygon cannot have a negative number of sides, the answer is 12.A polygon with n sides has n*(n-3)/2 diagonals.So you need to solve n*(n-3)/2 = 54n2 - 3n - 108 = 0 which has the solutions n = 12 or n = -9.Since a polygon cannot have a negative number of sides, the answer is 12.A polygon with n sides has n*(n-3)/2 diagonals.So you need to solve n*(n-3)/2 = 54n2 - 3n - 108 = 0 which has the solutions n = 12 or n = -9.Since a polygon cannot have a negative number of sides, the answer is 12.
What are all the solutions to sine theta - 1 in terms of pie?
The solutions are (4n - 1)*pi/2 for all integer values of n.
How many solutions does 6x 16 -22 6x have?
The expression (6x^{16} - 22 + 6x) is a polynomial in (x) of degree 16. A polynomial of degree (n) can have up to (n) real solutions. Therefore, this polynomial can have up to 16 solutions, depending on the specific values of the coefficients and the nature of the roots.
What causes mutations that ends in an n?
Radiation.
What causes shoulder blades pain?
N/a
What is the parabola effect?
what are the effects of the sign a and n to the parabola
