a:4:{s:8:"template";s:7342:"<!DOCTYPE html>
<html lang="en-US">
<head>
<meta charset="utf-8"/>
<meta content="width=device-width, user-scalable=no" name="viewport"/>
<title>{{ keyword }}</title>
<link href="//fonts.googleapis.com" rel="dns-prefetch"/>
<link href="//s.w.org" rel="dns-prefetch"/>

<link href="https://fonts.googleapis.com/css?family=Roboto:400,400italic,900,700,300,300italic" id="google-fonts-roboto-css" media="all" rel="stylesheet" type="text/css"/>
<link href="https://fonts.googleapis.com/css?family=Raleway:300" id="google-fonts-raleway-css" media="all" rel="stylesheet" type="text/css"/>
<style id="blesk-theme-style-css" media="all" rel="stylesheet" type="text/css">html,body,div,span,h1,h2,a,i,ul,li,form,footer,header,nav{border:0;font-size:100%;font:inherit;vertical-align:baseline;margin:0;padding:0}footer,header,nav{display:block}body{line-height:1}ul{list-style:none}a{text-decoration:none}*{margin:0;padding:0}input:focus{outline:none}footer .top-footer .center{box-sizing:border-box}a,.bottom-header .menunav,.bottom-header .search .open-search,body .bottom-header #blesk-search.search i.close-search,.bottom-header .search .search-input,.bottom-header .search .search-input .search-btn{-webkit-transition:all 0.3s;transition:all 0.3s}body{background-color:#fff;color:#a6a6a6;font-size:15px;line-height:1.6;font-family:'Roboto', sans-serif;font-weight:300;-webkit-font-smoothing:antialiased;-webkit-text-size-adjust:100%}.wrapper{margin:0 auto;max-width:1110px}h1,h2{font-weight:700;color:#202020}h1 a,h2 a{color:#202020}.cf:before,.cf:after{content:" ";display:table}.cf:after{clear:both}.cf{*zoom:1}a{color:#a6a6a6;text-decoration:none;outline:0}a:hover,a:focus{color:#dc0844}.overflow-h{overflow:hidden}.center-header{padding:42px 0}.bottom-header{background-color:#dc0844;color:#fff;position:relative}.bottom-header .menunav{display:block;width:98%;z-index:99;float:left;height:88px}.bottom-header .menunav .menu{display:inline-block;height:88px}.bottom-header .menunav .menu>li{min-height:88px;line-height:88px}.bottom-header .menunav .menu>li a{padding-right:45px}.bottom-header .menunav ul li{float:left}.bottom-header .menunav ul li a{font-size:18px;font-weight:500}.bottom-header .open-menu{float:left;padding:31px 0}.bottom-header .open-menu .open{font-size:22px;line-height:26px;cursor:pointer;display:none}.bottom-header .open-menu .close{font-size:22px;line-height:22px;cursor:pointer;display:none}.bottom-header .search{float:right;margin:32px 0;position:relative}.bottom-header .search .open-search,.bottom-header .search .close-search{font-size:18px;cursor:pointer}.bottom-header .search .open-search:hover,.bottom-header .search .close-search:hover{color:#202020}body .bottom-header #blesk-search.search .close-search{display:none}.bottom-header .search .search-input{position:absolute;top:0;bottom:-150px;right:-10px;margin:auto;width:220px;height:70px;padding:20px 25px;background-color:#dc0844;opacity:0;z-index:-1}.bottom-header .search .search-input input[type="search"]{width:100%;height:30px;padding:0 30px 0 10px;margin-top:20px;font-family:'Roboto', sans-serif;font-size:15px;color:#202020;border:none;border-radius:0;-webkit-appearance:none;-moz-appearance:none;appearance:none}.bottom-header .search .search-input input[type="submit"]{background:transparent;width:20px;height:20px;border:none;border-radius:0;-webkit-appearance:none;-moz-appearance:none;appearance:none;cursor:pointer;z-index:2;position:absolute;right:30px;top:45px}.bottom-header .search .search-input .search-btn{position:absolute;right:30px;top:45px;width:20px;height:20px;text-align:center;line-height:20px;color:#dc0844}footer .top-footer{border-top:1px solid #e1e1e1;padding:55px 0}footer .top-footer .center{width:51.36%;float:left;border-left:1px solid #e1e1e1;border-right:1px solid #e1e1e1;padding:0 80px;text-align:center}footer .top-footer .center .logo{margin-bottom:30px;display:inline-block}footer .bottom-footer{border-top:1px solid #e1e1e1;padding:37px 0;text-align:center}@media only screen and (max-width: 1180px){.wrapper{width:94%}.center-header{text-align:center}}@media only screen and (max-width: 1024px){.bottom-header .menunav{display:none;height:auto}.bottom-header .menunav .menu>li{min-height:50px;line-height:50px}.bottom-header .menunav li{border-bottom:1px solid rgba(255,255,255,0.1)}.bottom-header .menunav li:last-child{border-bottom:none}.bottom-header .menunav ul{position:relative !important;display:block !important;width:100% !important;height:auto !important;left:0 !important;top:0 !important}.bottom-header .menunav ul li{width:100%;left:0}.bottom-header .search{top:0;position:absolute;right:3%}.bottom-header .open-menu .open{display:block}footer .top-footer .center{padding:0 30px}}@media only screen and (max-width: 800px){.bottom-header .open-menu{padding:20px 0}.bottom-header .search{margin:21px 0}.bottom-header .search .search-input{bottom:0;height:30px;padding:18px;right:0;left:100%}.bottom-header .search .search-input input[type="search"]{margin-top:0}.bottom-header .search .search-input input[type="submit"],.bottom-header .search .search-input .search-btn{top:24px;right:24px}}@media only screen and (max-width: 560px){footer .top-footer .center{width:100%;padding:0 20px;border:none}}@media only screen and (max-width: 360px){.bottom-header .search .search-input{padding:18px 10px}.bottom-header .search .search-input input[type="submit"],.bottom-header .search .search-input .search-btn{right:15px}}
/*# sourceMappingURL=main.css.map */
</style>

</head>
<body class="">
<div class="overflow-h">
<header>
<div class="center-header">
<div class="wrapper cf">
<h1><a href="#">{{ keyword }}</a></h1><h2><a href="#">Just another WordPress site</a></h2>
</div>
</div>
<div class="bottom-header">
<div class="wrapper cf">
<div class="open-menu">
<span class="fa fa-bars open"></span>
<span class="fa fa-times close"></span>
</div>
<nav class="menunav"><ul class="menu" id="menu-ddd"><li class="menu-item menu-item-type-custom menu-item-object-custom menu-item-home menu-item-11" id="menu-item-11"><a href="#">Home</a></li>
<li class="menu-item menu-item-type-post_type menu-item-object-page menu-item-12" id="menu-item-12"><a href="#">Casinos</a></li>
<li class="menu-item menu-item-type-post_type menu-item-object-page menu-item-13" id="menu-item-13"><a href="#">Online</a></li>
<li class="menu-item menu-item-type-post_type menu-item-object-page menu-item-14" id="menu-item-14"><a href="#">Guide</a></li>
</ul></nav> <div class="search" id="blesk-search">
<i class="open-search fa fa-search"></i>
<i class="close-search fa fa-times"></i>
<div class="search-input">
<form action="#">
<input name="s" placeholder="Search " type="search" value=""/>
<input type="submit" value="Search"/>
<i class="search-btn fa fa-search"></i>
</form>
</div>
</div> </div>
</div>
</header>
{{ text }}
				<footer>
<div class="top-footer">
<div class="wrapper cf">
<div class="center" style="float: none; border: none; padding: 0; margin: 0 auto;"><a alt="Just another WordPress site" class="logo" href="#" title="{{ keyword }}"><h1>{{ keyword }}</h1><h2>Just another WordPress site</h2></a></div> </div>
</div>
<div class="bottom-footer">
<div class="wrapper cf">
<span class="copyright">
						Copyright  2017, {{ keyword }}. All Rights Reserved.</span>
</div>
</div>
</footer>
</div>



</body>
</html>";s:4:"text";s:3217:"This is easier shown when setting up the matrix. Matrix C and D below cannot be multiplied together because the number of columns in C does not equal the number of rows in D. In this case, the multiplication of these two matrices is not defined. Dot Product A vector has magnitude (how long it is) and direction:. Matrix Multiplication ... of 3x1 and 1x3 matrices__ is possible and the result matrix is a 3x3 matrix. The Cross Product. The 3x3 Cross Product block computes cross (or vector) product of two vectors, A and B, by generating a third vector, C, in a direction normal to the plane containing A and B, and with magnitude equal to the product of the lengths of A and B multiplied by the sine of the angle between them. How to multiply two 1X3 matrices together? Here are two vectors: They can be multiplied using the "Dot Product" (also see Cross Product).  The second and third rows are linearly dependent, since you can write one as a multiple of the other. How to conveniently do cross product of a 3x3 matrix with a 3d vector in matlab? I have been contemplating extending the definition of cross product for matrices, and I wonder if this has been done before. The product of two matrices is usually another ... Matrix C winds up being a matrix of cross products from the two vectors. ... and result is a matrice of 1X1 or 3X1 by 1X3 and result is 3X3. Matrix Multiplication Calculator. ... WHAT IS THE PRODUCT OF 5/10 X 5? Then, the determinant of the matrix and therefore the cross product is 0. ... and result is a matrice of 1X1 or 3X1 by 1X3 and result is 3X3. up vote 2 down vote favorite. I have been contemplating extending the definition of cross product for matrices, and I wonder if this has been done before. A 3D geometric vector is uniquely determined by a direction and a length. Matrix Multiplication ... 3x1 and 1x3 matrices__ is possible and the result matrix is a 3x3 matrix. Note as well that this means that the two cross products That is, if we assume a represents a column vector (a 3x1 matrix) and a T represents a row vector (a 1x3 matrix), ... Cross Product: ab. Ask Question. In order to use the function CROSS, the two inputs must be the same In this final section of this chapter we will look at the cross product of two vectors. ... 1x3, 3x3, 2x2 with 3x2, 3x1, 3x3, 2x2 matrices. How do you calculate a dot product between two matrices of different ... the inner products of two matrices, ... dot product or a cross product? ... Computing the dot product of two 3D vectors is equivalent to multiplying a 1x3 matrix by a 3x1 matrix. The cross product of a vector with any multiple of itself is 0. Scalar triple product Online calculator. How to multiply two 1X3 matrices together? As a result of multiplication you will get a new matrix that has the same quantity of rows as the 1st one has and the same quantity of columns as the 2nd one. Matrices for solving systems by elimination. Step 2 : Form the matrix and then calculate the determinant of The product of two matrices is usually another ... Matrix C winds up being a matrix of cross products from the two vectors. Also ... You dont need to know anything about matrices or determinants to use either of the methods. ";s:7:"keyword";s:33:"cross product of two 3x1 matrices";s:7:"expired";i:-1;}