1. Trang chủ
  2. » Luận Văn - Báo Cáo

VẬT lý địa CHẤN geoelectric

32 1,1K 0

Đang tải... (xem toàn văn)

Tài liệu hạn chế xem trước, để xem đầy đủ mời bạn chọn Tải xuống

THÔNG TIN TÀI LIỆU

Thông tin cơ bản

Định dạng
Số trang 32
Dung lượng 24,06 MB

Nội dung

Electrical Surveying •Exploit the differences of various electrical properties of rock and minerals •Resistivity method •Detects horizontal and vertical discontinuities in the electrical properties of the ground •Detects 3-D bodies of anomalous conductivity •Hydrogeology and engineering applications for the shallow subsurface •Induced Polarization •Makes use of the capacitive action of the subsurface to located zones where conductive materials are disseminated within host rock •Self Potential •Uses natural currents generated by electrochemical processes to locate shallow bodies of anomalous conductivity Resistivity •Resistivity usually depends on the amount of groundwater present, and on the amount of salts dissolved in it •Resistivity is often used for mapping the presence of rocks with different porosities •Hydrogeology – aquifers, contaminant transport, saline pollution •Mineral prospecting Artificially generated currents are introduced into the ground and the resulting potential differences are measured at the surface Basic Electrical Quantities Electrical charges flow around a circuit – current flows from positive to negative From: Mussett & Khan., 2000 Electrical current is measured in amperes (amp) – the amount of electric charge that passes any point in the circuit in second The current flows due to a potential difference (Voltage) A 1.5 volt battery produces a potential difference of 1.5 volts For most materials, the current increases in proportion to the potential difference – double the potential difference, the current doubles Ohm’s Law The amount of current flowing when the potential difference is volt is called the resistance of the piece, and is equal to the slope of the graph to the right V = R (Ω ) I Basic Electrical Quantities Resistance depends on the material and its shape: •A wire of copper has less resistance than one of lead with the same dimensions •A long thin wire has greater resistance than a short, fat one of the same material •Doubling the length doubles the resistance •Doubling the area of cross-section halves the resistance (similarly to water flow) From: Mussett & Khan., 2000 Resistivity (the quantity investigated by resistivity surveying) characterizes the material independent of its shape – it is measure in ohm-m (inverse of resistivity is conductivity) length resistance = resistivity * cross - sectional area resistivity = resistance * cross - sectional area length From: Mussett & Khan., 2000 From: Kearey et al., 2002 Rock and Mineral Resistivity Though some very good conductors (low resistivity) and insulators (high resistivity) occur naturally (silver and quartz respectively) most rocks fall somewhere between, but with a wide range of resistivites Rock and Mineral Resistivity Most rock forming minerals, i.e quartz, feldspar, mica, olivine, are good insulators Pores and cracks contain groundwater (fairly low resistivity) – resistivity of rock is therefore a function of porosity and pore saturation Water varies from pure (insulator) to salty (good conductor) Salts dissociate into positive and negative ions – common salt dissociates into Na+ and Cl- these move through the water forming a current = Ionic conduction (electronic conduction is due only to electrons – occurs in metals and some ores) From: Mussett & Khan., 2000 As the resistivity of a rock is largely due to the pore waters, a single rock can have a large range of resistivites, making lithological identification problematic Rock and Mineral Resistivity •The resistivity of porous, water bearing sediments (formation resistivity, P p) can be approximated from the porosity (Ф), the water saturation (Sw) and the resistivity of the pore water (ρw) – Archie’s Law ρ t = aρ wφ s −m −n w ρw =a m n φ Sw Where a, m, and n are constants determined from field of lab measurements – used commonly in the hydrocarbon industry •Archie’s law does not hold for clay minerals – the fine particles trap a layer of electrolyte around them – clay has low resistivity •Resistivity decreases as temperature rises – needs to be accounted for in borehole logging Electrical Flow in Rocks From: Mussett & Khan., 2000 Electrical connections are made through electrodes – metal rods pushed a few cm into the ground The current does not travel by the most direct route – as a thin layer has the most resistance, the current instead spreads out, both downwards and sideways, though there is a concentration near the electrodes In uniform ground only about 30% of the current penetrates below a depth equal to the separation of the electrodes Why Electrodes? •So far we have only used two electrodes In this case •This is not done in resistivity surveys because there is a large and unknown extra resistance between the electrode and the ground •The potential difference is instead measured between two other two potential electrodes – the voltmeter draws negligible current, therefore the contact potential difference is negligible •Power supply usually run from batteries •Wires have small resistances •Applied voltage ~100 volts, current ~mA •Potential difference typically volts to mV •As ions accumulate on the electrodes, they are dispersed by reversing the current flow a few times a second From: Mussett & Khan., 2000 the potential difference is measured between the ends of the resistance Wenner VES Survey •Four electrodes pushed into the ground symmetrically about the junction of the tapes •Electrode separation progressively increased – not incrementally as the same increment at a wide spacing would produce little or no change in reading – ie 1, 1.5, 2, 3, 4, 6, •Stopped when current is deep enough From: Mussett & Khan., 2000 •Two measuring tapes laid end to end Wenner VES Survey •Apparent resistivity is calculated for each spacing, using ρa = 2πa ΔV/I From: Mussett & Khan., 2000 •Graph is plotted of log10ρ vs log10a •The curves are both for two layer cases – same resistivities but different thickness upper layer •At small electrode spacing the current only penetrates the upper layer The apparent resistivity at small spacing is therefore the resistivity of the upper layer •At the largest spacing the curve flatten – here most of the current is spending most of its time in the lower layer Therefore the resistivity of the lower layer approximates the apparent resistivity at large spacing •The fact that the upper layer is thicker in the right-hand plot is apparent from the longer time spent at low apparent resistivity From: Mussett & Khan., 2000 Modeling the Data Modeling the Data •Electrode spacing is plotted as a ratio to the thickness of the top layer, a/h1, and the apparent resistivity as a ration to the resistivity if the top layer ρa / ρ1, with different curves labeled by the value of the ratio of the resistivities •The master curve and apparent resistivity curves must be on the same scale From: Mussett & Khan., 2000 •In practice the thickness of the layers and the resistivities are found by comparing the actual plot with master curves calculated for different values of thickness and resistivity Modeling the Data •The apparent resistivity plot is slid over the master curve until a match is found •The horizontal part of the curve cuts the y-axis at 1.27, giving a value of 18.9 ohmm for layer (ρ1) •The value for layer is thus * 18.9 = 113 ohm-m (ρ2) •The thickness of the top layer is found from where the a/h1 curve of the master curve cuts the x –axis on the apparent resistivity curve – in this case 0.2 m From: Mussett & Khan., 2000 •In this case it would be the ρa / ρ1 = Multiple Layers •The number of layers can be determined by the number of changes from concave to convex, or vice versa – kinks •This is the minimum number of layers •In reality, modeling for multiple layers is usually done on a computer, where a theoretical master curve can be compared actual data and a depth vs resistivity curve created From: Mussett & Khan., 2000 In the case of multiple layers, the curve never reaches the resistivity of layer as the current is penetrating into yet deeper layers Limitation of VES •Thin layers, or layers with negligible resistivity contrast are said to be suppressed •No hard guidelines on the limits of thickness of a detectable layer – usually estimated by modeling •Anisotropic layers have resistivities that vary perpendicular to lamination (shale) From: Mussett & Khan., 2000 •The method assumes that layers are horizontal – if they are dipping, are series of VES profiles should be carried out •Ambiguity •Schlumberger array: Only the current electrodes are moved further apart •Gradient: Current electrodes fixed, potential electrodes moved •Dipole-Dipole: Two current and two potential electrodes are moved as pairs with a fixed separation From: Mussett & Khan., 2000 Other Electrode Arrays Resistivity Profiling •Resistivity profiling investigates lateral changes •In VES an array is expanded symmetrically about a single point •In profiling some or all of the electrodes are moved laterally with fixed spacing •Targets usually include things like faults, intrusions, or ore veins •The transition becomes complicated as different combinations of the electrodes are in each rock •The Wenner array is particularly complicated, and varies depending on the electrode spacing •The array can also be arranged broadside to the feature •In the case of the gradient array the current electrodes are fixed, and the potential electrodes moved From: Mussett & Khan., 2000 •Far to each side of the boundary the resistivity is constant •If an ore reserve has be proven in a borehole, one current electrode can be put in the borehole in contact with the ore •Another current electrode is put on the surface beyond the extent of the ore •One potential electrode is fixed on the surface above the body •The second potential electrode is moved around (over the surface an/or down the borehole) •The apparent resistivity is measured and contoured to indicate the extent of the body From: Mussett & Khan., 2000 Mise-à-la-Masse Method Electrical Imaging Resistivity may vary both vertically and horizontally, so to create a complete image of the subsurface arrays have to be expanded and moved laterally •If the body is very elongated horizontally (veins, faults, layers), a pseudosection can be used From: Mussett & Khan., 2000 •Repeated profiles along the same traverse crossing the body with a range of electrode separations •In (a) the electrodes are first moved across the area with a constant separation • The value of resistivity is plotted between the electrodes at the point of intersection of 45o lines drawn down from the midpoint of each pair •The spacing is changed, and the process repeated •Values are plotted and contoured to create a pseudosection Electrical Imaging From: Mussett & Khan., 2000 A common distortion is a small area of low resistivity such as a massive sulphide giving rise to an inverted V, or ‘pant legs’ A Wenner array can also be used, with the values plotted below the midpoint of the array at a depth equal to the electrode spacing It is now possible to convert a pseudosection into to ‘true’ resistivity section using tomographic theory In the example to the right the ‘pant legs’ have been replaced by an oval area much closer to the size of the target From: Mussett & Khan., 2000 Electrical Imaging References Used Kearey, P., M Brooks, and I Hill, An Introduction to Geophysical Exploration, 2002 Mussett, A.E and M.A Khan, Looking into the Earth: An introduction to geological geophysics, 2000 ... shape – it is measure in ohm-m (inverse of resistivity is conductivity) length resistance = resistivity * cross - sectional area resistivity = resistance * cross - sectional area length From:... is measured and contoured to indicate the extent of the body From: Mussett & Khan., 2000 Mise-à-la-Masse Method Electrical Imaging Resistivity may vary both vertically and horizontally, so to... •The horizontal part of the curve cuts the y-axis at 1.27, giving a value of 18.9 ohmm for layer (ρ1) •The value for layer is thus * 18.9 = 113 ohm-m (ρ2) •The thickness of the top layer is found

Ngày đăng: 08/12/2016, 20:28

TỪ KHÓA LIÊN QUAN

TÀI LIỆU CÙNG NGƯỜI DÙNG

  • Đang cập nhật ...

TÀI LIỆU LIÊN QUAN